Write the exponential equation in its equivalent logarithmic form.
5^4 = 625
I know I have to change it to log or ln and something is equal to I think either 4 or 5.
1. B) log_5 625 = 4
2. A) log_1/3 1/27 = 3
3. D) 128 = 2^7
4. B) 1/9 = 3^-2
5. B) y = 4^x
6. B) y = 2^x-2
7. D) undefined
8. A) 0
9. C) Translate the graph up 1 unit
10. C) Translate the graph to the right 5 units and up 3 units
The first half of the quiz is below. Small note, if ur not sure about the graphs, put them in desmos or mathway. Please make sure to note whether is it above or below the x axis, cause that's easy to mix up in.
1. C)
2. A)
3. D)
4. B)
5. D) y = 790(1/2)^1/78x; 673.233kg
6. A) 4.9530
7. C) about 5.01 times as much energy
8. C)
9. A)
6 is C for the practice test but other than that, ALL CORRECT
100%
log(5^4) = log 625
4 log 5 = log 625
Yea is still correct
Yea you deserve the world
Yea is 100% correct
"Logarithmic Functions as Inverses Practice"
All Tea's answers worked except that 6 is C. (1/2)
thank u Tea and ur moms gf you're both saints
To convert the exponential equation 5^4 = 625 into its equivalent logarithmic form, you need to use the logarithmic base 5 (since the base of the exponentiation is 5).
In logarithmic form, the equation would be written as:
log5(625) = 4
Here, log5 represents the logarithm with a base of 5, and the argument of the logarithm is 625. Since 5^4 equals 625, the logarithm of 625 with base 5 is equal to 4.
Therefore, the equivalent logarithmic form of the given exponential equation is log5(625) = 4.