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Use a linear approximation to estimate the number (125.07)2/3
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Use a linear approximation to estimate the number (125.07)2/3

User Meylin
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1 Answer

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Let
f(x)=x^(2/3). You have
f(125)=(125)^(2/3)=(5^3)^(2/3)=5^2=25.

Taking the derivative, you get


f'(x)=\frac2{3x^(1/3)}\implies f'(125)=\frac2{3(125)^(1/3)}=\frac2{3*5}=\frac2{15}

The linear approximation to
f(x) near
x=125 is given by


L(x)=f(125)+f'(125)(x-125)\approx f(x)

So the value of
(125.07)^(2/3) can be estimated as


L(125.07)=f(125)+f'(125)(125.07-125)

L(125.07)=25+\frac2{15}(0.07)=25.009333\ldots
User Stella
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