Answer:
The value in 3x + 2 = 15 for x using the change of base formula is 0.465 approximately and second option is correct one.
Solution:
Given, expression is [tex]3^{(x+2)}=15[/tex]
We have to solve the above expression using change of base formula which is given as
[tex]\log _{b} a=\frac{\log a}{\log b}[/tex]
Now, let us first apply logarithm for the given expression.
Then given expression turns into as, [tex]x+2=\log _{3} 15[/tex]
By using change of base formula,
[tex]x+2=\frac{\log _{10} 15}{\log _{10} 3}[/tex]
x + 2 = 2.4649
x = 2.4649 – 2 = 0.4649
Hence, the value of x is 0.465 approximately and second option is correct one.
Answer:
0.465
Step-by-step explanation:
Solve 3x + 2 = 15 for x using the change of base formula log base b of y equals log y over log b. −1.594 0.465 2.406 4.465
rearranging the question
[tex]3^{x+2} =15[/tex].........1
the change of base in logarithm is given by.
[tex]log_{b} a=\frac{loga}{logb}[/tex]
back to equation 1
taking logarithm of the other end
x+2=[tex]log_{3} 15[/tex]
x+2=log 15/log 3
also
we could write
x+2(log3)=log15
x+2=2.465
x=2.465-2
x=0.465
