Tính đạo hàm y= ( x^2+1)(X^3+1)(x^4+1)

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asked Jul 14, 2022 56.6k views

5 votes

Tính đạo hàm y= ( x^2+1)(X^3+1)(x^4+1)

Mathematics
high-school

Christian Burgos asked

by Christian Burgos

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1 Answer

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Use the product and power rules:

y = (x^2+1)(x^3+1)(x^4+1)

The product rule says

$(\mathrm dy)/(\mathrm dx) = (\mathrm d(x^2+1))/(\mathrm dx)(x^3+1)(x^4+1) + (x^2+1)(\mathrm d(x^3+1))/(\mathrm dx)(x^4+1) + (x^2+1)(x^3+1)(\mathrm d(x^4+1))/(\mathrm dx)$

and using the power rule to compute the remaining derivatives gives

$(\mathrm dy)/(\mathrm dx) = \boxed{2x(x^3+1)(x^4+1) + 3x^2(x^2+1)(x^4+1) + 4x^3(x^2+1)(x^3+1)}$

Thebiffboff answered Jul 20, 2022

by Thebiffboff

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