- Find The Derivative Of The Function Using Chain Rule 3 H X X2 3 2 2x 6 1 3 H X 2 X 3 2 3 X2 3 1 4x X2 1 (10.25 KiB) Viewed 34 times
find the derivative of the function using chain rule 3. h(x)=(x2+3)−2(2x−6)−1 3. h(x)=2(x−3)2−3(x2+3)(1+4x−x2)
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find the derivative of the function using chain rule 3. h(x)=(x2+3)−2(2x−6)−1 3. h(x)=2(x−3)2−3(x2+3)(1+4x−x2)
find the derivative of the function using chain rule 3. h(x)=(x2+3)−2(2x−6)−1 3. h(x)=2(x−3)2−3(x2+3)(1+4x−x2)
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