COMEDK 2024 Shift 1 Paper

To find the rate of increase of the area of an equilateral triangle, we need to use the relationship between the side length of the triangle and its area. The formula for the area of an equilateral triangle with side length s is:


A=‌

√3

4

s2
We are given that the side length s is expanding at the rate of √3‌cm∕ sec, or
‌

ds

dt

=√3‌cm∕ sec
We are asked to find the rate of increase of the area A when the side length is 12 cm . This means we need to find ‌

dA

dt

when s=12‌cm.
To find ‌

dA

dt

, we differentiate the area formula with respect to time t :
‌

dA

dt

=‌

d

dt

(‌

√3

4

s2)
Using the chain rule, we get:
‌

dA

dt

=‌

√3

4

⋅2s⋅‌

ds

dt

Simplifying, we obtain:
‌

dA

dt

=‌

√3

2

s⋅‌

ds

dt

Substitute the given values for s and ‌

ds

dt

:
‌

dA

dt

=‌

√3

2

⋅12‌cm⋅√3‌cm∕ sec

Simplify the expression:
‌‌

dA

dt

=‌

√3

2

⋅12⋅√3cm2∕ sec
‌‌

dA

dt

=‌

3

2

⋅12cm2∕ sec
‌‌

dA

dt

=18cm2∕ sec

Therefore, the rate of increase of the area of the equilateral triangle when the side length is 12 cm is:
Option A: 18cm2∕ sec