To solve this expression, we will simplify it step by step.
First, let's combine the x^9 terms in the numerator:
x^9 * x^2 = x^(9+2) = x^11
Next, let's simplify the denominator:
x^7
Now, we can divide the numerator by the denominator:
(x^11)/(x^7) = x^(11-7) = x^4
Therefore, the simplified expression is x^4.
x^9 x^2/x^7
5 answers
(5p^8q^3) ( 2pq^7)
To simplify this expression, we will multiply the two terms together.
(5p^8q^3) (2pq^7)
First, let's multiply the coefficients:
5 * 2 = 10
Now, let's multiply the p terms:
p^8 * p = p^(8+1) = p^9
Finally, let's multiply the q terms:
q^3 * q^7 = q^(3+7) = q^10
Putting it all together, the simplified expression is:
10p^9q^10
(5p^8q^3) (2pq^7)
First, let's multiply the coefficients:
5 * 2 = 10
Now, let's multiply the p terms:
p^8 * p = p^(8+1) = p^9
Finally, let's multiply the q terms:
q^3 * q^7 = q^(3+7) = q^10
Putting it all together, the simplified expression is:
10p^9q^10
(5p^9q^3) ( 2pq^7)
To simplify this expression, we will multiply the two terms together.
(5p^9q^3) (2pq^7)
First, let's multiply the coefficients:
5 * 2 = 10
Next, let's multiply the p terms:
p^9 * p = p^(9+1) = p^10
Finally, let's multiply the q terms:
q^3 * q^7 = q^(3+7) = q^10
Putting it all together, the simplified expression is:
10p^10q^10
(5p^9q^3) (2pq^7)
First, let's multiply the coefficients:
5 * 2 = 10
Next, let's multiply the p terms:
p^9 * p = p^(9+1) = p^10
Finally, let's multiply the q terms:
q^3 * q^7 = q^(3+7) = q^10
Putting it all together, the simplified expression is:
10p^10q^10