Rationalize the denominator 5/√[3] + √[5]?

3 ANSWERS

1. 
   

   Is it:
   
   5/[√3+√5]
   
   Or:
   
   [5/√3]+√5
   
   Because according to the order of operations, it is the second one. However, i will do both.
   
   5/(√3+√5)
   
   To rationalize x/(√a+√b) multiply by (√a-√b)/(√a-√b) to get x(√a-√b)/(a-b)
   
   So, set x=5, a=3, b=5 to get:
   
   5(√3-√5)/(3-5)=(-5/2)(√3-√5) or (5/2)(√5-√3)
   
   Or:
   
   (5/√3)+√5=(5+√5√3)/√3=
   
   (5+√15)/√3=((5+√15)√3)/3=
   
   (5√3+√45)/3=
   
   (5√3+3√5)/3=
   
   (5/3)√3+(3/3)√5=
   
   (5/3)√3+√5
   
   HTH
   
   peace

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2. 
   

   5/sqrt(3) + sqrt(5)
   
   Multiply first term by sqrt(3)/sqrt(3) = 5 * sqrt(3) / 3
   
   Multiply second term by 3 / 3
   
   Add two terms.
   
   Answer = (5 * sqrt (3) + 3 * sqrt(5)) / 3
   
   

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3. 
   

   Square roots cannot be in the denominator, so simply multiply the denominator to the numerator and have the base of the denominator be the new denominator. In other words: 5/√3 = (5√3)/3. So:
   
   5√3 + √5
   
   (5√3)/3 + √5

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