How do i enter my answer?
so the question is Simplify:
√3:(63x^5/(72y^6))
and for my answer i got
x√3:(7x^2/(2y^2))
but my work page says: Enter example: For 4√3:(2), enter 4(2)^(1/3) so how do i enter my answer
If �ã3:(63x^5/(72y^6)) mean
�ã 3 /( 63 x ^ 5 / ( 72 y ^ 6 ) )
then :
�ã 3 / ( 63 x ^ 5 / ( 72 y ^ 6 ) ) =
�ã 3 * 72 y ^ 6 / ( 63 x ^ 5 ) =
�ã 3 * 9 * 8 * y ^ 6 / ( 9 * 7 x ^ 5 ) =
8 �ã 3 * y ^ 6 / 7 x ^ 5
�ã =square root
simplify
fourth root sqrt 32x^11y^15/fourth root sqrt 2x^3y^-2
To properly enter your answer, you need to follow the format provided by your work page. In this case, it states "For 4√3:(2), enter 4(2)^(1/3)." This format is often used to represent radicals or fractional exponents.
To apply this method to your answer, your expression is x√3:(7x^2/(2y^2)). To follow the given format, you will need to replace the square root (√) symbol with the fractional exponent format and enter the expression accordingly.
Let's break it down step by step:
First, rewrite the expression by replacing the square root symbol (√) with the fractional exponent format:
x * (3^(1/2)):(7x^2/(2y^2))
Next, simplify the expression within the parentheses using the given formula:
x * (3^(1/2)) * (2y^2/7x^2)
Now, combine the terms and cancel out any common factors if possible:
(2xy^2/7x^2) * (3^(1/2))
Finally, rearrange the expression, if necessary, to ensure it matches the given format:
(2xy^2 * 3^(1/2))/(7x^2)
So, that would be the proper way to enter your answer following the format provided.