Easier just to square both sides until all the roots disappear and you get y=3^x, and y^15=(2^15)^16. The answer from here is straightforward.

Substitute U for 3^x. Then convert radicals to exponents as others have, e.g., U^1/2 + U ^1/4, etc. U ^15/16 = 2 ^15. Take both sides to 16/15 th power. U = 2^16. Substitute back in: 3^x = 2^16. Take logs both sides and divide to get answer, x = 16 log 2/log 3.

x = 16 log 2/log 3

1/2 min vs 15.3 min. but money

X=16(log2/log3).....May be Explain later....... As per question 3^{(x/2)+(x/4)+(x/8)+(x/16)=2^15 3^(15x/16)=2^15 {3^(x/16}^15=2^15 So, 3^(x/16)=2 Take the log log{3^(x/16)}=log2 (X/16).log3=log2 (X/16)=log2/log3 X=16{log2/log3}

3^((15/16)*x)=2^15 , 3^((15/16)*x)=3^((ln2/ln3)*15) , (15/16)*x=(ln2/ln3)*15 , x=(ln2/ln3)*15/(15/16) , x=(ln2/ln3)*16 , test , 3^((15/16)*x)=~ 32768 , 2^15=32768 , same , OK ,