Any number to the power '0' equals '1'.
Proof ;
Let a^(n) = b
Then dividing
a^(n) / a^(n) = b/b
a^(n-n) = b/b
a^(0) = 1
Chat with our AI personalities
Any number to the power zero is equal to 1 - except zero to the power zero, which is undefined. So, if x is not equal to zero, the answer is 1.Any number to the power zero is equal to 1 - except zero to the power zero, which is undefined. So, if x is not equal to zero, the answer is 1.Any number to the power zero is equal to 1 - except zero to the power zero, which is undefined. So, if x is not equal to zero, the answer is 1.Any number to the power zero is equal to 1 - except zero to the power zero, which is undefined. So, if x is not equal to zero, the answer is 1.
Any Non-zero number, raised to the zero-power is equal to one (1). Zero raised to the zero power is not defined, but can converge towards a limit, for certain functions.
With the exception of 00 (which is undefined), any number to the power of zero is equal to 1.
Anything raised to the power of zero is zero !
Because any number raised to the power of 0 is always equal to 1