Find the derivatives of all orders of the functions y=(4x^{2}+3)(2-x)x

Dillard

Dillard

Answered question

2021-03-24

Find the derivatives of all orders of the functions y=(4x2+3)(2x)x

Answer & Explanation

Demi-Leigh Barrera

Demi-Leigh Barrera

Skilled2021-03-26Added 97 answers

Step 1
We first expand the expression
y=(4x2+3)(2x)x
y=(8x24x3+63x)x
y=8x34x4+6x3x2
y=4x4+8x33x2+6x
Step 2
Then we find the derivatives using the power rule
y=4x4+8x33x2+6x
y(1)=16x3+24x26x+6
y(2)=48x2+48x6
y(3)=96x+48
y(4)=96
y(5)=0
All other higher-order derivatives will be 0
alenahelenash

alenahelenash

Expert2022-01-24Added 556 answers

Given: y=(4x2+3)(2x)x simplifying above function we get y=4x4+8x33x2+6x y=f*(x)+kg(x) so sum rule: dydx=ddx(f(x))+ddx(kg(x)) d(kg(x))dx=kd(g(x))dx ddxxn=nx(n1) using above rules we get y

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