SOLUTION: if a^2+b^2=4 and b is not 1 nor 2 or rational number with it is not also true for 2^1/2 then proof that (a^1/2)/b^3+3a^4=ab^1/4*1/2^1/2

Question 1077752: if a^2+b^2=4
and b is not 1 nor 2 or rational number with it is not also true for 2^1/2 then proof that (a^1/2)/b^3+3a^4=ab^1/4*1/2^1/2
Answer by ikleyn(52787) (Show Source): You can put this solution on YOUR website!
.

Regarding your problem, I have a question related to this part of the condition:

". . . with it is not also true for 2^1/2 . . . "



What exactly "is not also true for 2^1/2"  ??



Think before you will answer my question.

RELATED QUESTIONS
Decide whether or not the following proposition is true. If it is false, demonstrate this (answered by solver91311,richard1234)

If �2 < a < 11 and 3 < b < 12, then which of the following is NOT true? (A) 1 < a+b < 23 (answered by ikleyn)

Let a, b be two positive numbers. Decide whether the given statement is true or false.... (answered by math_helper)

if a-1,a+1.b-2,b+2 are in proportion then.find a/b ,then prove that a+b/aa+b-3... (answered by ikleyn)

a that have an arrow on it = (2 -3 5) , b also with an arrow = (1 2 -1) (answered by Alan3354)

Use the factor theorem to show that if 2^p - 1, where p does not equal 3, is a prime... (answered by Edwin McCravy)

Give the reasons for each step of the proof: If a and b are negative numbers and... (answered by solver91311)

1) If a is a rational number, is it always, sometimes, or never true that a^2-3a over a-3 (answered by jim_thompson5910)

If the repeating decimal .36 is expressed as a rational number a/b with a and b integers... (answered by Theo)