Find the slopes of the lines which make the following angles with the positive direction of x - axis :

Find the slopes of the lines which make the following angles with the positive direction of x - axis :

Find the slopes of the lines which make the following angles with the positive direction of x - axis :

Find the slopes of the lines which make the following angles with the positive direction of x - axis :

Find the slopes of a line passing through the following points :

(– 3, 2) and (1, 4)

Find the slopes of a line passing through the following points :

(at²₁, 2at₁) and (at²₂, 2at₂)

Find the slopes of a line passing through the following points :

(3, – 5) and (1, 2)

State whether the two lines in each of the following are parallel, perpendicular or neither :

Through (5, 6) and (2, 3); through (9, – 2) and 96, – 5)

State whether the two lines in each of the following are parallel, perpendicular or neither :

Through (9, 5) and (– 1, 1); through (3, – 5) and 98, – 3)

State whether the two lines in each of the following are parallel, perpendicular or neither :

Through (6, 3) and (1,1); through (– 2, 5) and (2, – 5)

State whether the two lines in each of the following are parallel, perpendicular or neither :

Through (3, 15) and (16, 6); through (– 5, 3) and (8, 2)

Find the slopes of a line

(i) which bisects the first quadrant angle

(ii) which makes an angle of 30⁰ with the positive direction of y - axis measured anticlockwise.

Using the method of slopes show that the following points are collinear:

A(4, 8), b(5, 12), C(9, 28)

Using the method of slopes show that the following points are collinear:

A(16, – 18), B(3, – 6), C(– 10, 6)

What is the value of y so that the line through (3, y) and (2, 7) is parallel to the line through (– 1, 4) and (0, 6) ?

What can be said regarding a line if its slope is

(i) zero

(ii) positive

(iii) negative

Show that the line joining (2, – 3) and (– 5, 1) is parallel to the line joining (7, – 1) and (0, 3).

Show that the line joining (2, – 5) and (– 2, 5) is perpendicular to the line joining (6, 3) and (1,1).

Without using Pythagoras theorem, show that the points A(0, 4), B(1, 2), C(3, 3) are the vertices of a right – angled triangle.

Prove that the points (– 4, – 1), (– 2, – 4), (4, 0) and (2, 3) are the vertices of a rectangle.

If three points A(h, 0), P(a, b) and B(0, k) lie on a line, show that:

The slope of a line is double of the slope of another line. If tangents of the angle between them is , find the slopes of the other line.

Consider the following population and year graph:

Find the slope of the line AB and using it, find what will be the population in the year 2010.

Without using the distance formula, show that points (– 2, – 1), (4, 0), (3, 3) and (– 3, 2) are the vertices of a parallelogram.

Find the angle between the X - axis and the line joining the points (3, – 1) and (4, – 2).

The line through the points (– 2, 6) and 94, 8) is perpendicular to the line through the points (8, 12) and (x, 24). Find the value of x.

Find the value of x for which the points (x, – 1), (2, 1) and (4, 5) are collinear.

Find the angle between X - axis and the line joining the points (3, – 1) and (4, – 2).

By using the concept of slope, show that the points (– 2, – 1), (4, 0), (3, 3) and (– 3, 2) vertices of a parallelogram.

A quadrilateral has vertices (4, 1), (1, 7), (– 6, 0) and (– 1, – 9). Show that the mid – points of the sides of this quadrilateral form a parallelogram.

Find the equation of the parallel to x–axis and passing through (3, – 5).

Find the equation of the line perpendicular to x–axis and having intercept – 2 on x–axis.

Find the equation of the line parallel to x–axis and having intercept – 2 on y – axis.

Draw the lines x = – 3, x = 2, y = – 2, y = 3 and write the coordinates of the vertices of the square so formed.

Find the equations of the straight lines which pass through (4, 3) and are respectively parallel and perpendicular to the x–axis.

Find the equation of the line which is equidistant from the lines x = –2 and x = 6.

Find the equation of a line equidistant from the lines y = 10 and y = – 2.

Find the equation of a line making an angle of 150° with the x–axis and cutting off an intercept 2 from y–axis.

Find the equation of a straight line:

(i) with slope 2 and y – intercept 3;

(ii) with slope – 1/ 3 and y – intercept – 4.

(iii) with slope – 2 and intersecting the x–axis at a distance of 3 units to the left of origin.

Find the equations of the bisectors of the angles between the coordinate axes.

Find the equation of a line which makes an angle of tan ^{– 1} (3) with the x–axis and cuts off an intercept of 4 units on the negative direction of y–axis.

Find the equation of a line that has y – intercept – 4 and is parallel to the line joining (2, – 5) and (1, 2).

Find the equation of a line which is perpendicular to the line joining (4, 2) and (3 5) and cuts off an intercept of length 3 on y – axis.

Find the equation of the perpendicular to the line segment joining (4, 3) and (– 1 1) if it cuts off an intercept – 3 from y – axis.

Find the equation of the straight line intersecting y – axis at a distance of 2 units above the origin and making an angle of 30⁰ with the positive direction of the x–axis.

Find the equation of the straight line passing through the point (6, 2) and having slope – 3.

Find the equation of the straight line passing through ( – 2, 3) and indicated at an angle of 45° with the x – axis.

Find the equation of the line passing through (0, 0) with slope m

Find the equation of the line passing through (2, 2) and inclined with x – axis at an angle of 75⁰.

Find the equation of the straight line which passes through the point (1,2) and makes such an angle with the positive direction of x – axis whose sine is .

Find the equation of the straight line passing through (3, – 2) and making an angle of 60° with the positive direction of y – axis.

Find the equations of the straight lines which cut off an intercept 5 from the y – axis and are equally inclined to the axes.

Find the equation of the line which intercepts a length 2 on the positive direction of the x – axis and is inclined at an angle of 135° with the positive direction of the y – axis.

Find the equation of the straight line which divides the join of the points (2, 3) and ( – 5, 8) in the ratio 3 : 4 and is also perpendicular to it.

Prove that the perpendicular drawn from the point (4, 1) on the join of (2, – 1) and (6 5) divides it in the ratio 5:8.

Find the equations to the altitudes of the triangle whose angular points are A (2, – 2), B(1, 1), and C ( – 1, 0).

Find the equation of the right bisector of the line segment joining the points (3, 4) and ( – 1, 2).

Find the equation of the line passing through the point ( – 3, 5) and perpendicular to the line joining (2, 5) and ( – 3, 6).

Find the equation of the right bisector of the line segment joining the points A(1, 0) and B(2, 3).

Find the equation of the straight lines passing through the following pair of points:

(0, 0) and (2, - 2)

Find the equation of the straight lines passing through the following pair of points:

(a, b) and (a + c sin α, b + c cos α)

Find the equation of the straight lines passing through the following pair of points:

(0, - a) and (b, 0)

Find the equation of the straight lines passing through the following pair of points:

(a, b) and (a + b, a - b)

Find the equation of the straight lines passing through the following pair of points:

(at₁, a/t₁) and (at₂, a/t₂)

Find the equation of the straight lines passing through the following pair of points:

(a cos α, a sin α) and (a cos β, a sin β)

Find the equations to the sides of the triangles the coordinates of whose angular points are respectively:

(1,4), (2, - 3) and (-1, - 2)

Find the equations to the sides of the triangles the coordinates of whose angular points are respectively:

(0,1), (2, 0) and (-1, - 2)

Find the equations of the medians of a triangle, the coordinates of whose vertices are (-1, 6), (-3,-9) and (5, -8).

Find the equations to the diagonals of the rectangle the equations of whose sides are x = a, x = a', y = b and y = b'.

Find the equation of the side BC of the triangle ABC whose vertices are A (-1, -2), B (0, 1) and C (2, 0) respectively. Also, find the equation of the median through A (-1, - 2).

By using the concept of the equation of a line, prove that the three points (- 2, - 2), (8, 2) and (3, 0) are collinear.

Prove that the line y - x + 2 = 0 divides the join of points (3,-1) and (8, 9) in the ratio 2:3

Find the equation to the straight line which bisects the distance between the points (a, b), (a', b') and also bisects the distance between the points (-a, b) and (a', - b').

In what ratio is the line joining the points (2, 3) and (4, -5) divided by the line passing through the points (6, 8) and (- 3, -2).

The vertices of a quadrilateral are A (-2, 6), B (1, 2), C (10, 4) and D (7, 8). Find the equations of its diagonals.

The length L (in centimeters) of a copper rod is a linear function of its Celsius temperature C. In an experiment if L =124.942 when C =20 and L =125.134 when C =110, express L in terms of C.

The owner of a milk store finds that he can sell 980 liters milk each week at Rs. 14 per liter and 1220 liters of milk each week at Rs. 16 per liter. Assuming a linear relationship between selling price and demand, how many liters could he sell weekly at Rs. 17 per liter.

Find the equation of the bisector of angle A of the triangle whose vertices are A (4, 3), B (0, 0) and C (2,3).

Find the equations to the straight lines which go through the origin and trisect the portion of the straight line 3 x + y = 12 which is intercepted between the axes of coordinates.

Find the equations of the diagonals of the square formed by the lines x = 0, y = 0, x = 1 and y = 1.

Find the equation to the straight line

cutting off intercepts 3 and 2 from the axes.

Find the equation to the straight line

cutting off intercepts -5 and 6 from the axes.

Find the equation of the straight line which passes through (1, -2) and cuts off equal intercepts on the axes.

Find the equation to the straight line which passes through the point (5, 6) and has intercepts on the axes

Equal in magnitude and both positive

Find the equation to the straight line which passes through the point (5, 6) and has intercepts on the axes

Equal in magnitude but opposite in sign

For what values of a and b the intercepts cut off on the coordinate axes by the line ax + by + 8 = 0 are equal in length but opposite in signs to those cut off by the line 2x – 3y + 6 = 0 on the axes.

Find the equation to the straight line which cuts off equal positive intercepts on the axes and their product is 25

Find the equation of the line which passes through the point (-4, 3) and the portion of the line intercepted between the axes is divided internally in the ratio 5: 3 by this point.

A straight line passes through the point (α, β) and this point bisects the portion of the line intercepted between the axes. Show that the equation of the straight line is .

Find the equation of the line which passes through the point (3, 4) and is such that the portion of it intercepted between the axes is divided by the point in the ratio 2 : 3.

Point R (h, k) divided line segments between the axes in the ratio 1 : 2. Find the equation of the line.

Find the equation of the straight line which passes through the point (-3, 8) and cuts off positive intercepts on the coordinate axes whose sum is 7

Find the equation to the straight line which passes through the point (-4, 3) and is such that the portion of it between the axes is divided by the point in the ratio 5 : 3.

Find the equation of a line which passes through the point (22, -6) and is such that the intercept on x-axis exceeds the intercept on the y-axis by 5.

Find the equation of the line, which passes through P(1, -7) and meets the axes at A and B respectively so that 4AP – 3BP = 0.

Find the equation of the line passing through the point (2, 2) and cutting off intercepts on the axes whose sum is 9

Find the equations of the straight lines each of which passes through the point (3, 2) and cuts off intercepts a and b respectively on x and y-axes such that a – b = 2.

Find the equations of the straight lines which pass through the origin and trisect the portion of the straight line 2x + 3y = 6 which is intercepted between the axes.

Find the equation of the straight line passing through the point (2, 1) and bisecting the portion of the straight line 3x – 5y = 15 lying between the axes.

Find the equation of the straight line passing through the origin and bisecting the portion of the line ax + by + c = 0 intercepted between the coordinate axes.

Find the equation of a line for which

p = 5, α = 60°

Find the equation of a line for which

p = 4, α = 150°

Find the equation of a line for which

p = 8, α = 225°

Find the equation of a line for which

p = 8, α = 300°

Find the equation of the line on which the length of the perpendicular segment from the origin to the line is 4 and the inclination of the perpendicular segment with the positive direction of x–axis is 30°.

Find the equation of the line whose perpendicular distance from the origin is 4 units and the angle which the normal makes with the positive direction of x–axis is 15°.

Find the equation of the straight line at a distance of 3 units from the origin such that the perpendicular from the origin to the line makes an angle α given by with the positive direction of x–axis.

Find the equation of the straight line upon which the length of the perpendicular from the origin is 2, and the slope of this perpendicular is .

The length of the perpendicular from the origin to a line is 7, and the line makes an angle of 150⁰ with the positive direction of y–axis. Find the equation of the line.

Find the value of θ and p if the equation x cos θ + y sin θ = p is the normal form of the line .

Find the equation of the straight line which makes a triangle of the area with the axes and perpendicular from the origin to it makes an angle of 30⁰ with y–axis.

Find the equation of a straight line on which the perpendicular from the origin makes an angle of 30° with x–axis and which forms a triangle of the area with the axes.

A line passes through a point A (1, 2) and makes an angle of 60⁰ with the x–axis and intercepts the line x + y = 6 at the point P. Find AP.

If the straight line through the point P(3, 4) makes an angle with the x–axis and meets the line 12x + 5y + 10 = 0 at Q, find the length PQ.

A straight line drawn through the point A (2, 1) making an angle with positive x–axis intersects another line x + 2y + 1 = 0 in the point B. Find length AB.

A line a drawn through A (4, – 1) parallel to the line 3x – 4y + 1 = 0. Find the coordinates of the two points on this line which are at a distance of 5 units from A.

The straight line through P(x₁, y₁) inclined at an angle θ with the x–axis meets the line ax + by + c = 0 in Q. Find the length of PQ.

Find the distance of the point (2, 3) from the line 2x – 3y + 9 = 0 measured along a line making an angle of 45° with the x–axis.

Find the distance of the point (3, 5) from the line 2x + 3y = 14 measured parallel to a line having slope 1/2.

Find the distance of the point (2, 5) from the line 3x + y + 4 = 0 measured parallel to a line having slope 3/4.

Find the distance of the point (3, 5) from the line 2x + 3y = 14 measured parallel to the line x – 2y = 1.

Find the distance of the point (2, 5) from the line 3x + y + 4 = 0 measured parallel to the line 3x – 4y + 8 = 0.

Find the distance of the line 2x + y = 3 from the point ( – 1, – 3) in the direction of the line whose slope is 1.

A line is such that its segment between the straight line 5x – y – 4 = 0 and 3x + 4y – 4 = 0 is bisected at the point (1, 5). Obtain its equation.

Find the equation of straight line passing through ( – 2, – 7) and having an intercept of length 3 between the straight lines 4x + 3y = 12 and 4x + 3y = 3.

Reduce the equation to:

(i) slope - intercept form and find slope and y - intercept;

(ii) Intercept form and find intercept on the axes

(iii) The normal form and find p and α.

Reduce the following equations to the normal form and find p and α in each case :

Reduce the following equations to the normal form and find p and α in each case :

Reduce the following equations to the normal form and find p and α in each case :

Reduce the following equations to the normal form and find p and α in each case :

x – 3 = 0

Reduce the following equations to the normal form and find p and α in each case :

y – 2 = 0

Put the equation the slope intercept form and find its slope and y - intercept.

Reduce the lines 3x – 4y + 4 = 0 and 2x + 4y – 5 = 0 to the normal form and hence find which line is nearer to the origin.

Show that the origin is equidistant from the lines 4x + 3y + 10 = 0; 5x – 12y + 26 = 0 and 7x + 24y = 50.

Find the values of θ and p, if the equation x cos θ + y sin θ = p is the normal form of the line .

Reduce the equation 3x – 2y + 6 = 0 to the intercept form and find the x and y - intercepts.

The perpendicular distance of a line from the origin is 5 units, and its slope is - 1. Find the equation of the line.

Find the point of intersection of the following pairs of lines:

2x – y + 3 = 0 and x + y – 5 = 0

Find the point of intersection of the following pairs of lines:

bx + ay = ab and ax + by = ab

Find the point of intersection of the following pairs of lines:

Find the coordinates of the vertices of a triangle, the equations of whose sides are :

x + y – 4 = 0, 2x – y + 3 0 and x – 3y + 2 = 0

Find the coordinates of the vertices of a triangle, the equations of whose sides are :

y(t₁ + t₂) = 2x + 2at₁t₂. y(t₂ + t₃) = 2x + 2at₂t₃ and, y(t₃ + t₁) = 2x + 2at₁t₃.

Find the area of the triangle formed by the lines

y = m₁x + c₁, y = m₂x + c₂ and x = 0

Find the area of the triangle formed by the lines

y = 0, x = 2 and x + 2y = 3

Find the area of the triangle formed by the lines

x + y – 6 = 0, x – 3y – 2 = 0 and 5x – 3y + 2 = 0

Find the equations of the medians of a triangle, the equations of whose sides are :

3x + 2y + 6 = 0, 2x – 5y + 4 = 0 and x – 3y – 6 = 0

Classify the following pairs of lines as coincident, parallel or intersecting:

(i) 2x + y – 1 = 0 and 3x + 2y + 5 = 0

(ii) x – y = 0 and 3x – 3y + 5 = 0

(iii) 3x + 2y – 4 = 0 and 6x + 4y – 8 = 0

Find the equation of the line joining the point (3, 5) to the point of intersection of the lines 4x + y – 1 = 0 and 7x – 3y – 35 = 0.

Find the equation of the line passing through the point of intersection of the lines 4x – 7y – 3 = 0 and 2x – 3y + 1 = 0 that has equal intercepts on the axes.

Show that the area of the triangle formed by the lines y = m₁x, y = m₂x and y = c is equal to , where m₁, m₂ are the roots of the equation .

If the straight line passes through the point of intersection of the lines x + y = 3 and 2x – 3y = 1 and is parallel to x – y – 6 = 0, find a and b.

Find the orthocenter of the triangle the equations of whose sides are x + y = 1, 2x + 3y = 6 and 4x – y + 4 = 0.

Three sides AB, BC and CA of a triangle ABC are 5x – 3y + 2 = 0, x – 3y – 2 = 0 and x + y – 6 = 0 respectively. Find the equation of the altitude through the vertex A.

Find the coordinates of the orthocenter of the triangle whose vertices are ( - 1, 3), (2, - 1) and (0, 0).

Find the coordinates of the incentre and centroid of the triangle whose sides have the equations 3x – 4y = 0, 12y + 5x = 0 and y – 15 = 0.

Prove that the lines , , and form a rhombus.

Find the equation of the line passing through the intersection of the lines 2x + y = 5 and x + 3y + 8 = 0 and parallel to the line 3x + 4y = 7.

Find the equation of the straight line passing through the point of intersection of the lines 5x – 6y – 1 = 0 and 3x + 2y + 5 = 0 and perpendicular to the line 3x – 5y + 11 = 0.

Prove that the following sets of three lines are concurrent:

15x – 18y + 1 = 0, 12x + 10y – 3 = 0 and 6x + 66y – 11 = 0

Prove that the following sets of three lines are concurrent:

3x – 5y – 11 = 0, 5x + 3y – 7 = 0 and x + 2y = 0

Prove that the following sets of three lines are concurrent:

For what value of λ are the three lines 2x – 5y + 3 = 0, 5x – 9y + λ = 0 and x – 2y + 1 = 0 concurrent?

Find the conditions that the straight lines y = m₁x + c₁, y = m₂x + c₂ and y = m₃x + c₃ may meet in a point.

If the lines p₁x + q₁y = 1, p₂x + q₂y = 1 and p₃x + q₃y = 1 be concurrent, show that the points (p₁, q₁), (p₂, q₂) and (p₃, q₃) are collinear.

Show that the straight lines L₁ = (b + c)x + ay + 1 = 0, L₂ = (c + a)x + by + 1 = 0 and L₃ = (a + b)x + cy + 1 = 0 are concurrent.

If the three lines ax + a²y + 1 = 0, bx + b²y + 1 = 0 and cx + c²y + 1 = 0 are concurrent, show that at least two of three constant a, b, c are equal.

If a, b, c are in A. P., prove that the straight lines ax + 2y + 1 = 0, bx + 3y + 1 = 0 and cx + 4y + 1 = 0 are concurrent.

Show that the perpendicular bisectors of the sides of a triangle are concurrent.

Find the equation of a line passing through the point (2, 3) and parallel to the line 3x– 4y + 5 = 0.

Find the equation of a line passing through (3, -2) and perpendicular to the line x – 3y + 5 = 0.

Find the equation of the perpendicular bisector of the line joining the points (1, 3) and (3, 1).

Find the equations of the altitudes of a ΔABC whose vertices are A (1, 4), B(-3, 2) and C(-5, -3).

Find the equation of a line which is perpendicular to the line and which cuts off an intercept of 4 units with the negative direction of y-axis.

If the image of the point (2, 1) with respect to a line mirror is (5, 2), find the equation of the mirror.

Find the equation of the straight line through the point (α, β) and perpendicular to the line lx + my + n = 0.

Find the equation of the straight line perpendicular to 2x – 3y = 5 and cutting off an intercept 1 on the positive direction of the x-axis.

Find the equation of the straight line perpendicular to 5x – 2y = 8 and which passes through the mid-point of the line segment joining (2, 3) and (4, 5).

Find the equation of the straight line which has y-intercept equal to 4/3 and is perpendicular to 3x – 4y + 11 = 0.

Find the equation of the right bisector of the line segment joining the points (a, b) and (a₁, b₁).

Find the image of the point (2, 1) with respect to the line mirror x + y – 5 = 0.

If the image of the point (2, 1) with respect to the line mirror be (5, 2), find the equation of the mirror.

Find the equation to the straight line parallel to 3x – 4y + 6 = 0 and passing through the middle point of the join of points (2, 3) and (4, -1).

Prove that the lines 2x – 3y + 1 = 0, x + y = 3, 2x – 3y = 2 and x + y = 4 form a parallelogram.

Find the equation of a line drawn perpendicular to the line through the point where it meets the y-axis.

The perpendicular from the origin to the line y = mx + c meets it at the point (-1, 2). Find the values of m and c.

Find the equation of the right bisector of the line segment joining the points (3, 4) and (-1, 2).

The line through (h, 3) and (4, 1) intersects the line 7x – 9y – 19 = 0 at right angle. Find the value of h.

Find the image of the point (3, 8) with respect to the line x + 3y = 7 assuming the line to be a plane mirror.

Find the coordinates of the foot of the perpendicular from the point (-1, 3) to the line 3x – 4y – 16 = 0.

Find the projection of the point (1, 0) on the line joining the points (-1, 2) and (5, 4).

Find the equation of a line perpendicular to the line and at a distance of 3 units from the origin.

The line 2x + 3y = 12 meets the x-axis at A and y-axis at B. The line through (5, 5) perpendicular to AB meets the x-axis and the line AB at C and E respectively. If O is the origin of coordinates, find the area of figure OCEB.

Find the equation of the straight line which cuts off intercepts on x-axis twice that on y-axis and is at a unit distance from the origin.

The equations of perpendicular bisectors of the sides AB and AC of a triangle ABC are x – y + 5 = 0 and x + 2y = 0 respectively. If the point A is (1, -2), find the equation of the line BC.

Find the angles between each of the following pairs of straight lines :

3x + y + 12 = 0 and x + 2y – 1 = 0

Find the angles between each of the following pairs of straight lines :

3x – y + 5 = 0 and x – 3y + 1 = 0

Find the angles between each of the following pairs of straight lines :

3x + 4y – 7 = 0 and 4x – 3y + 5 = 0

Find the angles between each of the following pairs of straight lines :

x – 4y = 3 and 6x – y = 11

Find the angles between each of the following pairs of straight lines :

(m² – mn) y = (mn + n²)x + n³ and (mn + m²)y = (mn – n²)x + m³.

Find the acute angle between the lines 2x – y + 3 = 0 and x + y + 2 = 0.

Prove that the points (2, -1), (0, 2), (2, 3) and (4, 0) are the coordinates of the vertices of a parallelogram and find the angle between its diagonals.

Find the angle between the line joining the points (2, 0), (0, 3) and the line x + y = 1.

If θ is the angle which the straight line joining the points (x₁, y₁) and (x₂, y₂) subtends at the origin, prove that and .

Prove that the straight lines (a + b)x + (a – b)y = 2ab, (a – b)x + (a + b)y = 2ab and x + y = 0 form an isosceles triangle whose vertical angle is .

Find the angle between the lines x = a and by + c = 0.

Find the tangent of the angle between the lines which have intercepts 3, 4 and 1, 8 on the axes respectively.

Show that the line a²x + ay + 1 = 0 is perpendicular to the line x – ay = 1 for all non-zero real values of a.

Show that the tangent of an angle between the lines and is .

Find the values of α so that the point P(α ², α) lies inside or on the triangle formed by the lines x – 5y + 6 = 0, x – 3y + 2 = 0 and x – 2y – 3 = 0.

Find the values of the parameter a so that the point (a, 2) is an interior point of the triangle formed by the lines x + y – 4 = 0, 3x – 7y – 8 = 0 and 4x – y – 31 = 0.

Determine whether the point (-3, 2) lies inside or outside the triangle whose sides are given by the equations x + y – 4 = 0, 3x – 7y + 8 = 0, 4x – y – 31 = 0.

Find the distance of the point (4, 5) from the straight line 3x – 5y + 7 = 0.

Find the perpendicular distance of the line joining the points (cosθ, sinθ) and (cosϕ, sinϕ) from the origin.

Find the length of the perpendicular from the origin to the straight line joining the two points whose coordinates are (a cos α, a sin α) and (a cos β, a sin β).

Show that the perpendicular let fall from any point on the straight line 2x + 11y – 5 = 0 upon the two straight lines 24x + 7y = 20 and 4x – 3y – 2 = 0 are equal to each other.

Find the distance of the point of intersection of the lines 2x + 3y = 21 and 3x – 4y + 11 = 0 from the line 8x + 6y + 5 = 0.

Find the length of the perpendicular from the point (4, -7) to the line joining the origin and the point of intersection of the lines 2x – 3y + 14 = 0 and 5x + 4y – 7 = 0.

What are the points on X-axis whose perpendicular distance from the straight line is a ?

Show that the product of perpendicular on the line from the points is b².

Find the perpendicular distance from the origin of the perpendicular from the point (1, 2) upon the straight line.

Find the distance of the point (1, 2) from the straight line with slope 5 and passing through the point of intersection of x + 2y = 5 and x – 3y = 7.

What are the points on y-axis whose distance from the line is 4 units?

In the triangle ABC with vertices A(2, 3), B(4, -1) and C(1, 2) find the equation and the length of the altitude from the vertex A.

Show that the path of a moving point such that its distances from two lines 3x – 2y = 5 and 3x + 2y = 5 are equal is a straight line.

If sum of perpendicular distances of a variable point P(x, y) from the lines x + y – 5 = 0 and 3x – 2y + 7 = 0 is always 10. Show that P must move on a line.

If the length of the perpendicular from the point (1, 1) to the line ax – by + c = 0 be unity, Show that .

Determine the distance between the following pair of parallel lines:

4x – 3y – 9 = 0 and 4x – 3y – 24 = 0

Determine the distance between the following pair of parallel lines:

8x + 15y – 34 = 0 and 8x + 15y + 31 = 0

Determine the distance between the following pair of parallel lines:

y = mx + c and y = mx + d

Determine the distance between the following pair of parallel lines:

4x + 3y – 11 = 0 and 8x + 6y = 15

The equations of two sides of a square are 5x – 12y – 65 = 0 and 5x – 12y + 26 = 0. Find the area of the square.

Find the equation of two straight lines which are parallel to x + 7y + 2 = 0 and at unit distance from the point (1, -1).

Prove that the lines 2x + 3y = 19 and 2x + 3y + 7 = 0 are equidistant from the line 2x + 3y = 6.

Find the equation of the line mid-way between the parallel lines 9x + 6y – 7 = 0 and 3x + 2y + 6 = 0.

Find the ratio in which the line 3x + 4y + 2 = 0 divides the distance between the lines 3x + 4y + 5 = 0 and 3x + 4y – 5 = 0

Prove that the area of the parallelogram formed by the lines

a₁x + b₁y + c₁ = 0, a₁x + b₁y + d₁ = 0, a₂x + b₂y + c₂ = 0, a₂x + b₂y + d₂ = 0 is sq. units.

Deduce the condition for these lines to form a rhombus.

Prove that the area of the parallelogram formed by the lines 3x – 4y + a = 0, 3x – 4y + 3a = 0, 4x – 3y – a = 0 and 4x – 3y – 2a = 0 is sq. units.

Show that the diagonals of the parallelogram whose sides are lx + my + n = 0, lx + my + n’ = 0, mx + ly + n = 0 and mx + ly + n’ = 0 include an angle.

Find the equation of the straight lines passing through the origin and making an angle of 45⁰ with the straight line.

Find the equations to the straight lines which pass through the origin and are inclined at an angle of 75⁰ to the straight line.

Find the equations of straight lines passing through (2, -1) and making an angle of 45⁰ with the line 6x + 5y – 8 = 0.

Find the equations to the straight lines which pass through the point (h, k) and are inclined at angle tan^-1 m to the straight line y = mx + c.

Find the equations to the straight lines passing through the point (2, 3) and inclined at an angle of 45⁰ to the lines 3x + y – 5 = 0.

Find the equations to the sides of an isosceles right angled triangle the equation of whose hypotenuse is 3x + 4y = 4 and the opposite vertex is the point (2, 2).

The equation of one side of an equilateral triangle is x – y = 0 and one vertex is . Prove that a second side is and find the equation of the third side.

Find the equations of the two straight lines through (1, 2) forming two sides of a square of which 4x + 7y = 12 is one diagonal.

Find the equations of two straight lines passing through (1, 2) and making an angle of 60⁰ with the lines x + y = 0. Find also the area of the triangle formed by the three lines.

Two sides of an isosceles triangle are given by the equations 7x – y + 3 = 0 and x + y – 3 = 0 and its third side passes through the point (1, -10). Determine the equation of the third side.

Show that the point (3, -5) lies between the parallel lines 2x + 3y – 7 = 0 and 2x + 3y + 12 = 0 and find the equation of lines through (3, -5) cutting the above lines at an angle of 45°.

The equation of the base of an equilateral triangle is x + y = 2 and its vertex is (2, -1). Find the length and equations of its sides.

If two opposites vertices of a square are (1, 2) and (5, 8), find the coordinates of its other two vertices and the equations of its sides.

Find the equation of a straight line through the point of intersection of the lines 4x – 3y = 0 and 2x – 5y + 3 = 0 and parallel to 4x + 5 y + 6 = 0.

Find the equation of a straight line passing through the point of intersection of x + 2y + 3 = 0 and 3x + 4y + 7 = 0 and perpendicular to the straight line x – y + 9 = 0.

Find the equation of the line passing through the point of intersection of 2x – 7y + 11 = 0 and x + 3y – 8 = 0 and is parallel to (i) x = axis (ii) y-axis.

Find the equation of the straight line passing through the point of intersection of 2x + 3y + 1 = 0 and 3x – 5y – 5 = 0 and equally inclined to the axes.

Find the equation of the straight line drawn through the point of intersection of the lines x + y = 4 and 2x – 3y = 1 and perpendicular to the line cutting off intercepts 5, 6 on the axes.

Prove that the family of lines represented by x(1 + λ) + y(2 – λ) + 5 = 0, λ being arbitrary, pass through a fixed point. Also, find the fixed point.

Show that the straight lines given by (2 + k)x + (1 + k)y = 5 + 7k for different values of k pass through a fixed point. Also, find that point.

Find the equation of the straight line passing through the point of intersection of 2x + y – 1 = 0 and x + 3y – 2 = 0 and making with the coordinate axes a triangle of area 3/8 sq. units.

Find the equation of the straight line which passes through the point of intersection of the lines 3x – y = 5 and x + 3y = 1 and makes equal and positive intercepts on the axes.

Find the equations of the lines through the point of intersection of the lines x – 3y + 1 = 0 and 2x + 5y – 9 = 0 and whose distance from the origin is.

Find the equations of the lines through the point of intersection of the lines x – y + 1 = 0 and 2x – 3y + 5 = 0 whose distance from the point (3, 2) is .

Write an equation representing a pair of lines through the point (a, b) and parallel to the coordinates axes.

Write the coordinates of the orthocenter of the triangle formed by the lines x² – y² = 0 and x + 6y = 18.

If the centroid of a triangle formed by the points (0, 0), (cos θ, sin θ) and (sinθ, - cosθ) lies on the line y = 2x, then write the value of tanθ.

Write the value of for which area of the triangle formed by points O(0, 0), A(a cos θ, b sin θ) and (a cos θ, - b sin θ) is maximum.

Write the distance the lines 4x + 3y – 11 = 0 and 8x + 6y – 15 = 0.

Write the coordinates of the orthocenter of the triangle formed by the lines xy = 0 and x + y = 1

If the lines x + ay + a = 0, bx + y + b = 0 and cx + cy + 1 = 0 are concurrent then write the value of 2abc – ab – bc – ca.

Write the area of the triangle formed by the coordinate axes and the line (sec θ – tan θ)x + (sec θ + tan θ) y = 2.

If the diagonals of the quadrilateral formed by the lines l₁x + m₁y + n₁ = 0, l₂x + m₂y + n₂ = 0, l₁x + m₁y + n’₁ = 0 and l₂x + m₂y + n₂’ = 0 are perpendicular, then write the value of l¹² – l₂² + m¹₂ – m²₂.

Write the coordinates of the image of the point (3, 8) in the line x + 3y – 7 = 0.

Write the integral values of m for which the x-coordinate of the point of intersection of the lines y = mx + 1 and 3x + 4y = 9 is an integer.

If a ≠ b ≠ c, write the condition for which the equation (b – c)x + (c – a) y + (a – b) = 0 and (b³ – c³)x + (c³ – a³)y + (a³ – b³) = 0 represent the same line

If a, b, c are in G.P. write the area of the triangle formed by the line ax + by + c = 0 with the coordinates axes.

Write the area of the figure formed by the lines a|x| + b|y| + c = 0

Write the locus of a point the sum of whose distances from the coordinate’s axes is unity.

If a, b, c are in A.P., then the line ax + by + c = 0 passes through a fixed point. Write the coordinates of that point.

Write the equation of the line passing through the point (1, -2) and cutting off equal intercepts from the axes.

Find the locus of the mid-points of the portion of the line x sin θ + y cos θ = p intercepted between the axes.

L is variable line such that the algebraic sum of the distances of the points (1, 1), (2, 0) and (0, 2) from the line is equal to zero. The line L will always pass through

The acute angle between the medians drawn from the acute of a right angled isosceles triangle is

The distance between the orthocenter and circumcentre of the triangle with vertices (1, 2) (2, 1) and is

The equation of the straight line which passes through the point (-4, 3) such that the portion of the line between the axes is divided internally by the point in the ratio 5 : 3 is

Which point which divides the join of (1, 2) and (3, 4) externally in the ratio of 1 : 1.

A line passes through the point (2, 2) and is perpendicular to the line 3x + y = 3. Its y-intercepts is

If the lines ax + 12y + 1 = 0, bx + 13y + 1 = 0 and cx + 14y – 1 = 0 are concurrent, then a, b, c are in

The number of real values of λ for which the lines x – 2y + 3 = 0, λx + 3y + 1 = 0 and 4x – λy + 2 = 0 are concurrent is

The equations of the sides AB, BC and CA of ΔABC are y – x = 2, x + 2y = 1 and 3x + y + 5 = 0 respectively. The equation of the altitude through B is

If p₁ and p₂ are the lengths of the perpendiculars form the origin upon the lines x sec θ + y cosec θ = a and x cos θ – y sin θ = a cos 2 θ respectively, then

Area of the triangle formed by the points ((a + 3)(a + 4), a + 3), ((a + 2)(a + 3), (a + 2)) and ((a + 1)(a + 2), (a + 1)) is

If a + b + c = 0, then the family of lines 3ax + by + 2c = 0 pass through fixed point

The line segment joining the points (-3, -4) and (1, -2) is divided by y-axis in the ratio

The area of a triangle with vertices at (-4, -1), (1, 2) and (4, -3) is

The line segment joining the points (1, 2) and (-2, 1) is divided by the line 3x + 4y = 7 in the ratio

If the point (5, 2) bisects the intercept of a line between the axes, then its equation is

A(6, 3), B(-3, 5), C(4, -2) and (x, 3x) are four points. If ΔDBC : ΔABC = 1 : 2, then x is equal to

If p be the length of the perpendicular from the origin on the line x/a + y/b = 1, then

If equation of the line passing through (1, 5) and perpendicular to the line 3x – 5y + 7 = 0 is

The figure formed by the lines ax ± by ± c = 0 is

Two vertices of a triangle are (-2, -1) and (3, 2) and third vertex lies on the line x + y = 5. If the area of the triangle is 4 square units, then the third vertex is

The inclination of the straight line passing through the point (-3, 6) and the mid-point of the line joining the point (4, -5) and (-2, 9) is

Distance between the lines 5x + 3y – 7 = 0 and 15x + 9y + 14 = 0 is

The angle between the lines 2x – y + 3 = 0 and x + 2y + 3 = 0 is

The value of λ for which the lines 3x + 4y = 5, 5x + 4y = 4 and λx + 4y = 6 meet at a point is

Three vertices of a parallelogram taken in order are (-1, -6), (2, -5) and (7, 2). The fourth vertex is

The centroid of a triangle is (2, 7) and two of its vertices are (4, 80 and (-2, 6). The third vertex is

If the lines x + q = 0, y – 2 = 0 and 3x + 2y + 5 + 0 are concurrent, then the value of q will be

The medians AD and BE of a triangle with vertices A(0, b), B(0, 0) and C(a, 0) are perpendicular to each other, if

The equation of the line with slope -3/2 and which is concurrent with the lines 4x + 3y – 7 = 0 and 8x + 5y – 1 = 0 is

The vertices of a triangle are (6, 0), (0, 6) and (6, 6). The distance between its circumcentre and centroid is

A point equidistant from the line 4x + 3y + 10 = 0, 5x – 12y + 26 = 0 and 7x + 24y – 50 = 0 is

The ratio in which the line 3x + 4y + 2 = 0 divides the distance between the lines 3x + 4y + 5 = 0 and 3x + 4y – 5 = 0 is

The coordinates of the foot of the perpendicular from the point (2, 3) on the line x + y – 11 = 0 are

The reflection of the point (4, -13) about the line 5x + y + 6 = 0 is