Ask a New Question

The area,Acm^2, of a blot of ink is growing such that after t seconds,it is given by A=3t^2+1/5t. Find the rate at which the area is changing after 2 seconds.

1 answer

dA/dt = 6t + 1/5
plug in t = 2 for dA/dt

Ask a New Question or answer this question.

Similar Questions

The area of a blot of ink is growing such that after t seconds its area is given by A=(3t square +7) cm square. Calculate the
1. 4 answers
The area of a blot of ink is growing such that after t seconds its area is given by A=(3t square +7) cm square. Calculate the
1. 3 answers
The radius of a blot ink is increasing at a rate of 1.55mm per seconds.find the rate at which the area is increasing after 4
1. 1 answer
a circular ink-blot grows at a rate of 2 sq cm per second. find the rate at which the radius is increasing after (28/11)seconds.
1. 4 answers

more similar questions