Respuesta :
The expression results when the change of base formula is [tex]\rm \dfrac{log(x+2)}{log4}[/tex].
We have to determine
Which expression results when the change of base formula is applied to log Subscript 4 Baseline (x + 2)?
What is logarithmic property?
The logarithm of a product as a sum of logarithms, the log of the quotient as a difference of log, and log of power as a product.
The base change formula is;
[tex]\rm loga_x= \dfrac{log_bx }{log_ba}\\\\[/tex]
The expression results when the change of base formula is applied to log Subscript 4 Baseline (x + 2) is;
[tex]\rm = log_4(x+2)\\\\=\dfrac{log(x+2)}{log4}[/tex]
Hence, the expression results when the change of base formula is [tex]\rm \dfrac{log(x+2)}{log4}[/tex].
To know more about base property click the link given below.
https://brainly.com/question/15972912
