Log=ea 47.38
ln 60 = a
c=3^27
10^a=300.. apex!
log(478) = e10e = 478
That depends on the equation.
10a = 478
ln 60 = a
10^a=300.. apex!
c=3^27
log(478) = e10e = 478
The logarithmic equation ( x \ln 4 ) can be rewritten in exponential form. To find the equivalent equation, we recognize that if ( y = x \ln 4 ), then ( e^y = e^{x \ln 4} = e^{\ln 4^x} = 4^x ). Therefore, none of the provided options directly represent this equivalence, but if we had to choose the closest representation, ( B. x4e ) suggests a relationship involving exponentiation, but it is not correctly formatted. The correct answer should be ( 4^x ).
15 1/2
Any number below negative one.
To convert an exponential expression to an equivalent radical expression, you can use the relationship ( a^{m/n} = \sqrt[n]{a^m} ). For example, the expression ( x^{3/2} ) can be rewritten as ( \sqrt{x^3} ) or ( \sqrt{x^3} = x^{3/2} ). If you provide a specific exponential expression, I can give you its corresponding radical form.
The answer is given below!
Try the following links (in the Related Links section below).
That depends on the equation.