Answer:
A. The cube of difference between 5 times square of y and 7 divided by The square of 2 times y
Step-by-step explanation:
Given
[tex]\frac{(5y^2 - 7)^3}{(2y)^2}[/tex]
Required
Interpret
To interpret the given expression, we start by splitting it to two (Numerator and Denominator)
[tex]Numerator = (5y^2 - 7)^3[/tex]
[tex]Denominator = (2y)^2[/tex]
Expand the numerator
[tex]Numerator = (5y^2 - 7)^3[/tex]
[tex]Numerator = (5 * y^2 - 7)^3[/tex]
Now, we can interpret as follows;
[tex]Numerator = (5 * y^2 - 7)^3[/tex] -> The cube of [tex](5 * y^2 - 7)[/tex]
[tex](5 * y^2 - 7)^3[/tex] -> The cube of difference between [tex]5 * y^2[/tex] and 7
[tex](5 * y^2 - 7)^3[/tex] -> The cube of difference between 5 * square of y and 7
[tex](5 * y^2 - 7)^3[/tex] -> The cube of difference between 5 times square of y and 7
Similarly;
[tex]Denominator = (2y)^2[/tex]
[tex]Denominator = (2*y)^2[/tex]
Interpret
[tex]Denominator = (2*y)^2[/tex] -> The square of 2 * y
[tex]Denominator = (2*y)^2[/tex] -> The square of 2 times y
Bringing the interpretation of the numerator and the denominator, we have;
The cube of difference between 5 times square of y and 7 divided by The square of 2 times y
Hence, option A is correct
