which of the following is the equation a^(2b+1)=3c-d written in logarithmic form?
A.log_a (3c-d)=2b+1
B.log_a (2b+1)=3c-d
C.log_(2b+1) a=3c-d
D.log_(2b+1) (3c-d)=a
how does the graph of the transformed function g(x)=log_5(4x-16) compare to the graph of its parent function f(x)=log_5x?
A. The transformed function has been compressed horizontally and translated 16 units to the right
B. The transformed function has been stretched horizontally and translated 16 units to the right.
C. The transformed function has been compressed horizontally and translated 4 units to the right.
D. The transformed function has been stretched horizontally and translated 4 units to the right.
rewrite the expression as a single logarithm
1/4 ln x+5[ln (x-2)-3/10 ln (x+2)]
A. In(5x(x-2)/6(x+2))
B. In(4sqrx(x-2)^5/sqr(x+2)^3)
C.In(4sqrx(x-2)^5/sqr(x+3)^5)
D.In(4sqrx(x-2)^5/10sqr(x+2)^3)
solve 5^3x+1=4^x-5 for x
A.-5log4+log5/log4+3log5
B.5log4-log5/log4+3log5
C.5log4-log5/log4-3log5
D.5log4+log5/log4-3log5
The equation a^(2b+1) = 3c-d written in logarithmic form is:
A. log_a (3c-d) = 2b+1
The graph of the transformed function g(x) = log_5(4x-16) compared to the graph of its parent function f(x) = log_5x is:
A. The transformed function has been compressed horizontally and translated 16 units to the right
Rewriting the expression as a single logarithm:
C. In(4sqrx(x-2)^5/sqr(x+3)^5)
Solving 5^(3x+1) = 4^(x-5) for x:
B. 5log4-log5/log4+3log5