details\nno additional details were added for this assignment.\nhw5 the limit laws (target l4; §2.3)\nscore…

details\nno additional details were added for this assignment.\nhw5 the limit laws (target l4; §2.3)\nscore: 10/13 answered: 10/13\nquestion 11\nevaluate the limit\nlim_{y→3} \\frac{3(y^{2}-1)}{7y^{2}(y - 1)^{3}}\nquestion help: message instructor
Answer
Explanation:
Step1: Expand the expressions
First, expand the numerator $3(y^{2}-1)=3y^{2}-3$ and the denominator $7y^{2}(y - 1)^{3}=7y^{2}(y^{3}-3y^{2}+3y - 1)=7y^{5}-21y^{4}+21y^{3}-7y^{2}$.
Step2: Substitute $y = 3$ into the limit expression
We have $\lim_{y\rightarrow3}\frac{3(y^{2}-1)}{7y^{2}(y - 1)^{3}}=\frac{3(3^{2}-1)}{7\times3^{2}(3 - 1)^{3}}$.
Step3: Calculate the numerator
$3(3^{2}-1)=3\times(9 - 1)=3\times8 = 24$.
Step4: Calculate the denominator
$7\times3^{2}(3 - 1)^{3}=7\times9\times8=504$.
Step5: Simplify the fraction
$\frac{24}{504}=\frac{1}{21}$.
Answer:
$\frac{1}{21}$