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If f(x)=6x^3+5x,g(x)=3x^2+5,and h(x)=9x^2-8 what is the degree of f(g(h(x))) awer choices are a.2 b.3 3.7 4.12

If f(x)=6x^3+5x,g(x)=3x^2+5,and h(x)=9x^2-8 what is the degree of f(g(h(x))) awer choices are a.2 b.3 3.7 4.12
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If f(x)=6x^3+5x,g(x)=3x^2+5,and h(x)=9x^2-8 what is the degree of f(g(h(x))) awer choices are a.2 b.3 3.7 4.12

User Ilayaraja
by
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2 Answers

1 vote

Answer:

The degree is 12

Explanation:

User Pronngo
by
8.5k points
6 votes
To find f(g(h(x))), we need to find g(h(x)) first. To do that we are going to evaluate the function g(x) at h(x):
We know that
h(x)=9x^2-8 and
g(x)=3x^2+5

g(h(x))=g(9x^2-8)=3(9x^2-8)^2+5

=3(81x^4-144x^2+64)+5

=243x^4-432x^2+192+5

=243x^4-432x^2+197

Now that we know that
g(h(x))=243x^4-432x^2+197, to find
f(g(h(x))) we are going to evaluate
f at
243x^4-432x^2+197

f(g(h(x)))=f(243x^4-432x^2+197)

f(243x^4-432x^2+197)=6(243x^4-432x^2+197)^3
+5(243x^4-432x^2+197)


=86093442x^(12)-459165024x^(10)+1025681130x^8-1228219200x^6
+83152048x^4-301780944x^2+45873223

Since the degree of a polynomial is the highest degree of its monomials, we can conclude that the degree of f(g(h(x))) is 12
User Mrig
by
8.0k points
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