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Simplify √48x^10y^13 to the form a√b
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Simplify √48x^10y^13 to the form a√b

User Notytony
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1 Answer

3 votes

Question:

Solution:

Consider the following expression:


\sqrt{48x^(10)y^(13)}

Applying the properties of radicals, we get:


√(48)\sqrt{x^(10)}\text{ }\sqrt{y^(13)}

now, this is equivalent to:


4√(3)\sqrt{x^(10)}\text{ }\sqrt{y^(13)}

this is equivalent to:


4√(3)\text{ x}^5y^6√(y)

this is equivalent to:


4\text{x}^5y^6√(3)\text{ }√(y)

finally, applying the properties of radicals, we get:


4\text{x}^5y^6√(3y)\text{ }

Answer: we can conclude that the correct answer is:


a=4x^5y^6

and


b=3y

Simplify √48x^10y^13 to the form a√b-example-1
User Sergiomse
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