Question

differentiation of sin^3x/3​

Answer 1

Explanation:

To apply the Chain Rule, set u1 u 1 as sin(3x) sin ( 3 x ) . Differentiate using the Power Rule which states that ddu1[u1n] d d u 1 [ u 1 n ] is nu1n−1 n u 1 n - 1 where n=3 n = 3 . Replace all occurrences of u1 u 1 with sin(3x) sin ( 3 x ) .

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Answer 2

Answer:

To apply the Chain Rule, set u1 u 1 as sin(3x) sin ( 3 x ) . Differentiate using the Power Rule which states that ddu1[u1n] d d u 1 [ u 1 n ] is nu1n−1 n u 1 n - 1 where n=3 n = 3 . Replace all occurrences of u1 u 1 with sin(3x) sin ( 3 x ) .