Question

Math question!

Answer 1

\[Log_2(x-3)=Log_343\]

Answer 2

they are not same bases!

Answer 3

fbi arent we seeing both sides in log to the base of 2?

Answer 4

2 LHS and 3 RHS

Answer 5

maybe we can say x = 3+ \[2^{Log _{3}^{43}}\]

Answer 6

Bu what is \[Log_{3}^{43}\]? U can find it though

Answer 7

maybe!

Answer 8

Connection snapped.

Answer 9

This is the most rude joke, I made it up and solve it, it was easy, I just had a question in literature and no one helped.

Answer 10

\[Log_2(a)=Log_3(46)/Log_13\]\[Log_3(a)/Log_1(a)=Log_3(46)/Log_13\]
a=46/3

Answer 11

Nope I am not convinced! U cannot divide logs which are not in same bases. I can write that x= 3 + Val, where

Answer 12

\[val = 2^{y}\]

Answer 13

\[y = \frac{Log _{10}^{43} }{ Log_{10}^{3} }\]

Answer 14

U can see that my logs are all in base 10 making it feasible for someone to calculate their values, right?