Asked by Brett
Find The Derivative
y = 5x^(2)e^(3x)
Please Show Work
y = 5x^(2)e^(3x)
Please Show Work
Answers
Answered by
Steve
Just use the product rule and the chain rule:
y = 5x<sup>2</sup>e<sup>3x</sup>
y' = 5 * 2x e<sup>3x</sup> + 5x<sup>2</sup> * e<sup>3x</sup> * 3
y' = 5xe<sup>3x</sup>(2 + 3x)
y = 5x<sup>2</sup>e<sup>3x</sup>
y' = 5 * 2x e<sup>3x</sup> + 5x<sup>2</sup> * e<sup>3x</sup> * 3
y' = 5xe<sup>3x</sup>(2 + 3x)
Answered by
pranav
Good
Answered by
Charlette
I don't understand how you got the answer. Can you break it down further with more detail?
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