Chapter 10 Straight Lines

ALL CBSE STUFF
Class XI

Chapter 10 – Straight Lines

Maths

Exercise 10.1
Question 1:
Draw a quadrilateral in the Cartesian plane, whose vertices are (–4, 5), (0, 7), (5, –5) and (–4, –2). Also, find its area.

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Answer

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,

SU
M

IT

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the given quadrilateral can be drawn as

To find the area of quadrilateral ABCD, we draw one diagonal, say AC.
Accordingly, area (ABCD) = area (∆ABC) + area (∆ACD)
We know that the area of a triangle whose vertices are (x1, y1), (x2, y2), and (x3, y3) is

Therefore, area of ∆ABC

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Chapter 10 – Straight Lines

Maths

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Class XI

IT

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Area of ∆ACD

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M

Thus, area (ABCD)

Question 2:

The base of an equilateral triangle with side 2a lies along they y-axis such that the mid point of the base is at the origin. Find vertices of the triangle.
Answer

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).
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Class XI

Chapter 10 – Straight Lines

Maths

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

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Hence, vertex A lies on the y-axis.

On applying Pythagoras theorem to ∆AOC, we obtain

⇒ (2a)2 = (OA)2 + a2
⇒ 4a2 – a2 = (OA)2

⇒ OA =

IT

⇒ (OA)2 = 3a2

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(AC)2 = (OA)2 + (OC)2

∴Coordinates of point A =

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

(0, a), (0, –a), and

or

.

Question 3:

Find the distance between

and

when: (i) PQ is parallel to the y-axis,

(ii) PQ is parallel to the x-axis.
Answer

The given points