The answer will depend on what you wish to change it to!
Then, if the exponent is a positive integer, the value is 1 multiplied by the base repeatedly, exponent times. If the exponent is a negative integer then it is the reciprocal of the above value.In either case, it is NOT the base multiplied by itself an exponent number of times.
If the base of the exponent is 1, the function becomes constant, yielding a value of 1 for all inputs, as (1^x = 1). If the base is between 0 and 1, the function will exhibit a decreasing behavior, approaching 0 as (x) increases, since (b^x) (where (0 < b < 1)) results in values that get smaller with larger (x). This means that the function will approach the horizontal axis (but never touch it) as (x) increases.
It's Exponent.:)The exponent
A exponent is a number that tells how many times a base is used to factor. This is used in math.
Power
exponent-the no. of times a quantity is multiplied by itself
(2a3)(10a5)/4a1
i dont know please tell me
The exponent of the base is a step to solve the problems now the exponent of the product will also adjust a step to solve the equation but it contains more cooperative need.
No.
12 is the base, 3 is the exponent.
To change a negative exponent to a positive one, you take the reciprocal of the base raised to the positive exponent. For example, ( a^{-n} ) can be rewritten as ( \frac{1}{a^n} ), where ( a ) is the base and ( n ) is the positive exponent. This rule applies to any non-zero base.
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
To find the missing base of an exponent, you can use logarithms. If you have an equation in the form ( a^x = b ), where ( a ) is the base and ( b ) is the result, you can take the logarithm of both sides: ( x \log(a) = \log(b) ). Then, solve for the missing base ( a ) by rearranging the equation, which may involve exponentiation or using properties of logarithms. Alternatively, if you have a specific value for the exponent and result, you can also use trial and error or graphing methods to estimate the base.
A negative exponent simply means that the base is on the wrong side of the fraction line.For example, if you have x-2, you can turn this into a positive exponent by moving the base to the denominator and changing the sign on the exponent. The result would be:1--x2
"The base of the exponent" doesn't make sense; base and exponent are two different parts of an exponential function. To be an exponential function, the variable must be in the exponent. Assuming the base is positive:* If the base is greater than 1, the function increases. * If the base is 1, you have a constant function. * If the base is less than 1, the function decreases.
I assume you are asking for the exponent when 60 is raised to a power. Since 60 is a composite number, there is no specific exponent that corresponds to it. The exponent depends on the specific equation or problem you are working on.