-6.1.12 solve for x 3^{2x}=105

karush · Dec 11, 2021

solve for $\ x \quad 3^{2x}=105$
rewrite $x\ln3^2=x\ln{9}=\ln{105}$
hence $x=\dfrac{\ln{105}}{\ln{9}}$

can this be reduced more except for decimal

HOI · Dec 11, 2021

I would have done this a little differently:
2x ln(3)= ln(105)

x= ln(105)/2ln(3).

Of course, since 9= 3^2, ln(9)= 2ln(3) so that is the same as your answer. Whether it is "simpler" or not is a matter of personal choice.

Prove It · Dec 19, 2021

Why not just $\displaystyle x = \frac{1}{2}\log_3{\left( 105 \right) }$?

karush · Dec 19, 2021

change of base then..

Prove It · Dec 19, 2021

karush said:

change of base then..

I'm asking, why are you even bothering to change the base at all? The base of your exponential equation is 3, surely the best base for your logarithm would therefore also be 3...

HOI · Dec 19, 2021

But my calculator doesn't HAVE a "logarithm base 3" key!

Prove It · Dec 19, 2021

Country Boy said:

But my calculator doesn't HAVE a "logarithm base 3" key!

And why are you bothering to use a calculator? Surely they would want an exact answer...

-6.1.12 solve for x 3^{2x}=105

Related to -6.1.12 solve for x 3^{2x}=105

1. What is the value of x in the equation 3^(2x)=105?

2. How do I solve for x in the equation 3^(2x)=105?

3. Can I use a calculator to solve for x in the equation 3^(2x)=105?

4. Is there more than one solution to the equation 3^(2x)=105?

5. Can I use a different base for the logarithm when solving for x in the equation 3^(2x)=105?

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