Express x34(log3x)2+log3x−54=√3 in terms of t wheret = log3 x.
+ - 5t - 2 = 0
Given equation is x34(log3x)2+log3x−54=√3
Taking log on both sides at base 3
Taking log on both sides of equation 1 at base 3
log3{x34(log3x)2+log3x−54}=log3312
(34(log3x)2+log3x−54)log3x=12
Substitute log3x = t
34t3 + t2 - 54t = 12
3t2 + 4t2 - 5t = 2
3t3 + 4t2 - 5t - 2 = 0