Find the deivative of the function y(x) = 25x^7−10x^7/5x^4

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asked Aug 20, 2024 190k views

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Crc · Answer 1 · 2024-08-25T15:30:57+0000

Answer:

The derivative is,

$dy/dx = 175x^(6)-30x^(2)\\$

Explanation:

We have the function,

y(x) = 25x^7-10x^7/(5x^4)

Simplifying,

$y(x) = 25x^7-10x^7/(5x^4)\\\\y(x) = 25x^7-10x^3$

Now, calculating the derivative,

$d/dx[y(x)] = d/dx[25x^7-10x^3]\\dy/dx=d/dx[25x^7]-d/dx[10x^3]\\dy/dx=25d/dx[x^7]-10d/dx[x^3]\\dy/dx = 25(7)x^(7-1)-10(3)x^(3-1)\\dy/dx = 175x^(6)-30x^(2)\\$

Hence we have found the derivative

Find the deivative of the function y(x) = 25x^7−10x^7/5x^4

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