Given p(x)=3x^5+2x^2-5, what is the value of the function at -5/3

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asked Jun 22, 2020 228k views

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Walt Jones · Answer 1 · 2020-06-28T06:43:51+0000

Answer:

-(3080)/(81)

Explanation:

The given function is:

p(x)=3x^(5)+2x^(2)-5

We have to find the value of the function at x = -5/3

In order to do this we need to replace every occurrence of x in the given function by -5/3. i.e.

$p(-(5)/(3))=3(-(5)/(3))^(5)+2(-(5)/(3) )^(2)-5\\\\ p(-(5)/(3))=3(-(3125)/(243) )+2((25)/(9) )-5\\\\p(-(5)/(3))=-(3125)/(81)+(50)/(9)-5\\\\ p(-(5)/(3))=-(3080)/(81)$

Thus, the value of the function at x =-5/3 is

Given p(x)=3x^5+2x^2-5, what is the value of the function at -5/3

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