no dividing by zero equals to 0
A dur negative 1 ,0 does nothing when dividing
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.
No. Zero is the exception to the rule, as you cannot divide anything by zero. For everything else though, dividing by itself does indeed give 1.
No, 1 is not equal to 0. 0 is equal to 0 and 1 is equal to 1.
To divide a number by zero means the number will be unchanged, same as dividing by 1. Try dividing by zero on a calculator and you will get an undefined error message.
Dividing by zero can cause all sorts of errors (like "proving" that 1 = 0), so division by zero is strictly avoided in modern math.
Anything to the power zero is equal to 1 by definition.
Any real number (besides zero) divided by itself is equal to 1. In algebraic terms, if x is a non-zero real number then x/x=1. Zero is the exception because dividing a number by zero is undefined. For example 5 divided by itself is 1. 5/5=1
if you look on at this. 3^2=9 3^1=3 3^0=1 it's dividing by 3 every time so the answer for 3^0 =1
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
factor
Because zero is nothing. The figure zero isn't actually a number - it's a place-filler. Dividing anything by nothing will always result in the answer infinity.