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Simplify. Assume y and x are greater than zero,
\sqrt{49 {y}^(9){x}^(7) } / 4

Simplify. Assume y and x are greater than zero, \sqrt{49 {y}^(9){x}^(7) } / 4-example-1
User Alan Z
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1 Answer

19 votes
19 votes

The simplification will give;


\frac{7\sqrt[]{q^9r^7}}{2}

Here, we want to make a simplification

We proceed as follows;


\sqrt[]{(49q^9r^7)/(4)}\text{ = }\frac{\sqrt[]{49}\text{ }*\sqrt[]{q^9\text{ }}\text{ }*\sqrt[]{r^7}}{\sqrt[]{4}}

As we can see, the power of 9 and 7 are not perfect squares since they are odd

Thus, we have the expression as;


\frac{7*\sqrt[]{q^{9\text{ }}}\text{ }*\sqrt[]{r^7}}{2}\text{ = }\frac{7\sqrt[]{q^9r^7}}{2}

According to laws of indices;


\begin{gathered} a^9=a^(4.5)* a^(4.5) \\ a^6=a^3* a^3 \\ (a^9)^{(1)/(2)}=a^{(9)/(2)} \\ (a^6)^{(1)/(2)}=a^{(6)/(2)}=a^3 \end{gathered}

User Pasine
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