2x+5 is eual to 0 because if x is zero it will equal to zero so it can be both depands on the question
It is 2x/x where x is any non-zero integer.
int[e(2X) +e(- 2X)] integrate term by term 1/22 e(2X) - 1/22 e(- 2X) + C (1/4)e(2X) - (1/4)e(- 2X) + C ====================
2x to the fourth power minus 162 equals -146
Zero to any power is always zero.
If it were any other power other than zero, then we'd have to know what 'x' is. But anything to the zero power is ' 1 '.
2x = 2x + 0 Hence the constant term is 0 (zero)
Zero.
4
Zero. The sum of anything and it's opposite is zero, that's how an opposite is defined. In this case, the opposite of 2x + 1 is -(2x + 1) = -2x - 1 by the distributive property. Adding like terms, 2x + -2x + 1 +-1 = 0 + 0 = 0.
1
2x+5 is eual to 0 because if x is zero it will equal to zero so it can be both depands on the question
2x 2x to the second
-2x-2x-2x-2x-2=-32
Zero to any power is zero; any non-zero number to the power zero is one. Thus, zero to the power zero is sort of contradictory.
Zero to the fifth power is zero. Zero divided by zero is indeterminate.
Any number except zero, raised to the power zero, equals 1. Zero to the power zero is not defined.Any number except zero, raised to the power zero, equals 1. Zero to the power zero is not defined.Any number except zero, raised to the power zero, equals 1. Zero to the power zero is not defined.Any number except zero, raised to the power zero, equals 1. Zero to the power zero is not defined.