Well, it is 5 once, correct? So the answer would be 5. (Use a calculator to check)
Coefficient -5. Base: x. exponent: 3. Value: depends on the value of x. or Base: (-5)1/3x, exponent: 3
105 is a power. 10 is the base and the exponent is 5.
In the number 25 the exponent is 5. Whereas, 2 is the base.
1 is the base, 40 is the exponent (140)
Base 5, exponent 3 (53)
Coefficient -5. Base: x. exponent: 3. Value: depends on the value of x. or Base: (-5)1/3x, exponent: 3
Base 6, exponent 5.
The base of an exponent is the main number. For example in 56 the number 5 is the base and 6 is the exponent.
Answer: 1 Something like 52 is called a power. The base is 5 and the exponent is 2. If the exponent is not given it is assumed to be one, so that 760 = 7601. The exponent is 1.
If you are referring to the number 125 itself, then 125 is the base, and 1 is the exponent. This would be written as 1251. This number can also be written as 53, as 5 cubed also equals 125. In this case, 5 is the base, and 3 is the exponent. The main integer value is the base, the number to the upper right of it is the exponent. The exponent tells you how many times to multiply the base number by itself to find the answer.
The two are related. The answer could be base 2, exponent 18 or base 8, exponent 6 or base 10, exponent 5.4185 or base 262144, exponent 1 or base 68,719,476,736 and exponent 0.5
It is not enough to look at the base. This is because a^x is the same as (1/a)^-x : the key is therefore a combination of the base and the sign of the exponent.0 < base < 1, exponent < 0 : growth0 < base < 1, exponent > 0 : decaybase > 1, exponent < 0 : decaybase > 1, exponent > 0 : growth.
105 is a power. 10 is the base and the exponent is 5.
In the number 25 the exponent is 5. Whereas, 2 is the base.
1 is the base, 40 is the exponent (140)
Base 5, exponent 3 (53)
You can define any base you like and calculate an appropriate exponent or, you can pick an exponent and calculate the base. So you can have base 25, with exponent 2 or base 5 and exonent 4 or base e (the base for natural logarithms) and exponent 6.437752 (to 6 dp) or base 10 and exponent 2.795880 (to 6 dp) or base 2 and exponent 9.287712 etc or base 8.54988 (to 3 dp) and exponent 3 or base 3.623898 (to 3 dp) and exponent 5 etc There is no need for the base to be an integer or even rational. Probably the most important bases in advanced mathematics is e, which is a transcendental number. Similarly, there is no need for the exponent to be an integer.