Simplified Root :
4 x2y • sqrt(2)
Step-by-step explanation:
Factor 32 into its prime factors
     32 = 25 Â
To simplify a square root, we extract factors which are squares, i.e., factors that are raised to an even exponent.
Factors which will be extracted are :
     16 = 24 Â
Factors which will remain inside the root are :
     2 = 2 Â
To complete this part of the simplification we take the squre root of the factors which are to be extracted. We do this by dividing their exponents by 2 :
     4 = 22 Â
At the end of this step the partly simplified SQRT looks like this:
    4 • sqrt (2x4y2) Â
STEP
2
:
Simplify the Variable part of the SQRT
Rules for simplifying variables which may be raised to a power:
 (1) variables with no exponent stay inside the radical
 (2) variables raised to power 1 or (-1) stay inside the radical
 (3) variables raised to an even exponent: Half the exponent taken out, nothing remains inside the radical. examples:
   (3.1) sqrt(x8)=x4
  (3.2) sqrt(x-6)=x-3
  (4) variables raised to an odd exponent which is  >2  or  <(-2) , examples:
   (4.1) sqrt(x5)=x2•sqrt(x)
  (4.2) sqrt(x-7)=x-3•sqrt(x-1)
Applying these rules to our case we find out that
   SQRT(x4y2) = x2y
Combine both simplifications
    sqrt (32x4y2) =
    4 x2y • sqrt(2) Â
Simplified Root :
4 x2y • sqrt(2) Factor 32 into its prime factors
     32 = 25 Â
To simplify a square root, we extract factors which are squares, i.e., factors that are raised to an even exponent.
Factors which will be extracted are :
     16 = 24 Â
Factors which will remain inside the root are :
     2 = 2 Â
To complete this part of the simplification we take the squre root of the factors which are to be extracted. We do this by dividing their exponents by 2 :
     4 = 22 Â
At the end of this step the partly simplified SQRT looks like this:
    4 • sqrt (2x4y2) Â
STEP
2
:
Simplify the Variable part of the SQRT
Rules for simplifing variables which may be raised to a power:
 (1) variables with no exponent stay inside the radical
 (2) variables raised to power 1 or (-1) stay inside the radical
 (3) variables raised to an even exponent: Half the exponent taken out, nothing remains inside the radical. examples:
   (3.1) sqrt(x8)=x4
  (3.2) sqrt(x-6)=x-3
  (4) variables raised to an odd exponent which is  >2  or  <(-2) , examples:
   (4.1) sqrt(x5)=x2•sqrt(x)
  (4.2) sqrt(x-7)=x-3•sqrt(x-1)
Applying these rules to our case we find out that
   SQRT(x4y2) = x2y
Combine both simplifications
    sqrt (32x4y2) =
    4 x2y • sqrt(2) Â
Simplified Root :
4 x2y • sqrt(2) Factor 32 into its prime factors
     32 = 25 Â
To simplify a square root, we extract factors which are squares, i.e., factors that are raised to an even exponent.
Factors which will be extracted are :
     16 = 24 Â
Factors which will remain inside the root are :
     2 = 2 Â
To complete this part of the simplification we take the squre root of the factors which are to be extracted. We do this by dividing their exponents by 2 :
     4 = 22 Â
At the end of this step the partly simplified SQRT looks like this:
    4 • sqrt (2x4y2) Â
STEP
2
:
Simplify the Variable part of the SQRT
Rules for simplifing variables which may be raised to a power:
 (1) variables with no exponent stay inside the radical
 (2) variables raised to power 1 or (-1) stay inside the radical
 (3) variables raised to an even exponent: Half the exponent taken out, nothing remains inside the radical. examples:
   (3.1) sqrt(x8)=x4
  (3.2) sqrt(x-6)=x-3
  (4) variables raised to an odd exponent which is  >2  or  <(-2) , examples:
   (4.1) sqrt(x5)=x2•sqrt(x)
  (4.2) sqrt(x-7)=x-3•sqrt(x-1)
Applying these rules to our case we find out that
   SQRT(x4y2) = x2y
Combine both simplifications
    sqrt (32x4y2) =
    4 x2y • sqrt(2) Â