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britesoulusjhq

britesoulusjhq

Answered question

2022-05-06

Take the derivative of sin ( π x ) x 2 .

Answer & Explanation

rynosluv101swv2s

rynosluv101swv2s

Beginner2022-05-07Added 19 answers

Differentiate using the Product Rule which states that ddx[f(x)g(x)] is f(x)ddx[g(x)]+g(x)ddx[f(x)] where f(x)=sin(πx) and g(x)=x2.

sin(πx)ddx[x2]+x2ddx[sin(πx)]

Differentiate using the Power Rule which states that ddx[xn] is nxn-1 where n=2.

sin(πx)(2x)+x2ddx[sin(πx)]

Differentiate using the chain rule, which states that ddx[f(g(x))] is f(g(x))g(x) where f(x)=sin(x) and g(x)=πx.

sin(πx)(2x)+x2(cos(πx)ddx[πx])

Differentiate.

2xsin(πx)+πx2cos(πx)

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