Question

How do you find instantaneous rate of change for the equation # y=4x^3+2x-3#?

Answer 1

Take the derivative: `" "12x^2 + 2`

Explanation:

The rate of change for an equation may simply be defined mathematically as the slope at any point.

if `f(x) = 4x^3 + 2x -3` then

`f'(x) = 12x^2 + 2` using the power rule from calculus.

For each polynomial term, multiply the exponent times the coefficient and decrease the exponent by one.

Thus for `f'(x), 4x^3` becomes `(3 xx 4) x^(3-1) = 12x^2` (power rule)

`f'(x)` for `2x` becomes `(1 xx 2)x^(1-1) = 2`

`f'(x)` for -3 becomes `(0 xx 3) = 0`

Combine the terms (sum rule): `12x^2 + 2`.