Question:medium

The diagonal of a square is changing at the rate of \( 0.5 \, \text{cm/sec} \). Then the rate of change of area, when the area is 400 \( \text{cm}^2 \), is equal to:

Show Hint

Use related rates to find the rate of change of area when the dimensions of a shape change.

Updated On: Mar 25, 2026

\( 20 \sqrt{2} \, \text{cm}^2/\text{sec} \)
\( 10 \sqrt{2} \, \text{cm}^2/\text{sec} \)
\( 1 \sqrt{2} \, \text{cm}^2/\text{sec} \)
\( 5 \sqrt{2} \, \text{cm}^2/\text{sec} \)

Show Solution

The Correct Option is B

Solution and Explanation

Was this answer helpful?

0

Top Questions on Rate of Change of Quantities

Questions Asked in BITSAT exam

You measure two quantities as \( A = 1.0 \,m \pm 0.2 \,m \), \( B = 2.0 \,m \pm 0.2 \,m \). We should report the correct value for \( \sqrt{AB} \) as:

BITSAT - 2024
distance between two points

The dimensional formula of latent heat is:

BITSAT - 2024
laws of motion

The dimensions of the coefficient of self-inductance are:

BITSAT - 2024
Inductance

A particle is moving in a straight line. The variation of position $ x $ as a function of time $ t $ is given as:
$ x = t^3 - 6t^2 + 20t + 15 $.
The velocity of the body when its acceleration becomes zero is:

BITSAT - 2024
thermal properties of matter