Learn Exercise 10.1 with Free Lessons & Tips

Let ABCD be the given quadrilateral with vertices A (–4, 5), B (0, 7), C (5, –5), and D (–4, –2).

Then, by plotting A, B, C, and D on the Cartesian plane and joining AB, BC, CD, and DA, the given quadrilateral can be drawn as

To find the area of quadrilateral ABCD, we draw one diagonal, say AC.

Accordingly, area (ABCD) = area (ΔABC) + area (ΔACD)

We know that the area of a triangle whose vertices are (x₁, y₁), (x₂, y₂), and (x₃, y₃) is 

Therefore, area of ΔABC

Area of ΔACD

Thus, area (ABCD)

Let ABC be the given equilateral triangle with side 2a.

Accordingly, AB = BC = CA = 2a

Assume that base BC lies along the y-axis such that the mid-point of BC is at the origin.

i.e., BO = OC = a, where O is the origin.

Now, it is clear that the coordinates of point C are (0, a), while the coordinates of point B are (0, –a).

It is known that the line joining a vertex of an equilateral triangle with the mid-point of its opposite side is perpendicular.

Hence, vertex A lies on the y-axis.

On applying Pythagoras theorem to ΔAOC, we obtain

(AC)² = (OA)² + (OC)²

⇒ (2a)² = (OA)² + a²

⇒ 4a² â€“ a² = (OA)²

⇒ (OA)² = 3a²

⇒ OA =

∴Coordinates of point A =

Thus, the vertices of the given equilateral triangle are (0, a), (0, –a), and  or (0, a), (0, –a), and.

The given points are and.

(i) When PQ is parallel to the y-axis, x₁ = x₂.

In this case, distance between P and Q 

(ii) When PQ is parallel to the x-axis, y₁ = y₂.

In this case, distance between P and Q 

Let (a, 0) be the point on the x axis that is equidistant from the points (7, 6) and (3, 4).

On squaring both sides, we obtain

a² – 14a + 85 = a² – 6a + 25

⇒ –14a + 6a = 25 – 85

⇒ –8a = –60

Thus, the required point on the x-axis is.

The coordinates of the mid-point of the line segment joining the points

P (0, –4) and B (8, 0) are

It is known that the slope (m) of a non-vertical line passing through the points (x₁, y₁) and (x₂, y₂) is given by.

Therefore, the slope of the line passing through (0, 0) and (4, –2) is

.

Hence, the required slope of the line is.

The vertices of the given triangle are A (4, 4), B (3, 5), and C (–1, –1).

It is known that the slope (m) of a non-vertical line passing through the points (x₁, y₁) and (x₂, y₂) is given by.

∴Slope of AB (m₁)

Slope of BC (m₂)

Slope of CA (m₃)

It is observed that m₁m₃ = –1

This shows that line segments AB and CA are perpendicular to each other

i.e., the given triangle is right-angled at A (4, 4).

Thus, the points (4, 4), (3, 5), and (–1, –1) are the vertices of a right-angled triangle.

If a line makes an angle of 30° with the positive direction of the y-axis measured anticlockwise, then the angle made by the line with the positive direction of the x-axis measured anticlockwise is 90° + 30° = 120°.

Thus, the slope of the given line is tan 120° = tan (180° – 60°) = –tan 60° 

If points A (x, –1), B (2, 1), and C (4, 5) are collinear, then

Slope of AB = Slope of BC

Thus, the required value of x is 1.

Let points (–2, –1), (4, 0), (3, 3), and (–3, 2) be respectively denoted by A, B, C, and D.

Slope of AB

Slope of CD =

⇒ Slope of AB = Slope of CD

⇒ AB and CD are parallel to each other.

Now, slope of BC =

Slope of AD =

⇒ Slope of BC = Slope of AD

⇒ BC and AD are parallel to each other.

Therefore, both pairs of opposite sides of quadrilateral ABCD are parallel. Hence, ABCD is a parallelogram.

Thus, points (–2, –1), (4, 0), (3, 3), and (–3, 2) are the vertices of a parallelogram.

The slope of the line joining the points (3, –1) and (4, –2) is 

Now, the inclination (θ ) of the line joining the points (3, –1) and (4, – 2) is given by

tan θ= –1

⇒ θ = (90° + 45°) = 135°

Thus, the angle between the x-axis and the line joining the points (3, –1) and (4, –2) is 135°.

Let be the slopes of the two given lines such that.

We know that if θisthe angle between the lines l₁ and l₂ with slopes m₁ and m₂, then.

It is given that the tangent of the angle between the two lines is.

Case I

If m = –1, then the slopes of the lines are –1 and –2.

If m =, then the slopes of the lines areand –1.

Case II

If m = 1, then the slopes of the lines are 1 and 2.

If m =, then the slopes of the lines are.

Hence, the slopes of the lines are –1 and –2 or and –1 or 1 and 2 or.

The slope of the line passing through is.

It is given that the slope of the line is m.

Hence,

If the points A (h, 0), B (a, b), and C (0, k) lie on a line, then

Slope of AB = Slope of BC

On dividing both sides by kh, we obtain

Hence,