Evaluate the limit , if it exists. lim_{h->0} ((x+h)^3-x^3)/h

kunikwece

kunikwece

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2022-08-19

Evaluate the limit , if it exists.
limh0(x+h)3x3h

Answer & Explanation

margenar0g

margenar0g

Beginner2022-08-20Added 9 answers

limh0(x+h)3x3h
Recall that: A3B3=(AB)(A2+AB+B2)
=limh0(x+hx)[(x+h)2+(x+h)x+x2]h
=lim(h)[(x+h)2+(x+h)x+x2]{h}
Cancel h from both the numerator and the denominator
=limh0(x+h)2+(x+h)x+x2
Note that the denominator is no longer zero upon direct substitution
=(x+0)2+(x+0)x+x2=x2+x2+x2=3x2
saillantpq

saillantpq

Beginner2022-08-21Added 3 answers

Let's calculate the limit of the numerator and the limit of the denominator.
00
Insofar as 00 is uncertainty, L'Hôpital's rule applies. L'Hôpital's rule states that the limit of the quotient of functions is equal to the limit of their partial derivatives.
limh0(x+h)3x3h=limh0ddh[(x+h)3x3]ddh[h]
Find the Derivative of the Numerator and Denominator
limh03(x+h)21
Let's take the limit of each term.
3(limh0x+limh0h)2lim1h0
Determine limits by substituting 0 for all occurrences h.
3(x+0)21
3x2

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