It is 5*1 = 5 because any number to the power of zero is 1
4y3(4+5y)Improved Answer:-16y3/20y4 = 4/5y
5y + 5y = 10y
Zero to any power is always zero.
It is 1 because everything to the zero power is 1.
-3
ANY number to the zero power is ' 1 '.
0
The x-intercept is the point where the y-intercept is zero. "3x 5y 9" is not an equation. 3x+5y+9, or 3x-5y+9, are examples of what was meant to be shown.
4y3(4+5y)Improved Answer:-16y3/20y4 = 4/5y
LCM(5y3, 25y6) = 25y6
5y + 5y = 10y
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.
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.
Zero to the fifth power is zero. Zero divided by zero is indeterminate.
If you do not know what y is equal to then you can not evaluate this. If it is equal to zero then y is equal to 6/5.
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.
x + 5y = 0Subtract 5y from each side of the equation, just to put 'x' and 'y' on opposite sides.x = -5yThis is interesting. If EITHER 'x' OR 'y' is zero, then the other one is also zero.The only place on the graph where that is true is the origin. So the line goes through the origin,and the 'x' and 'y' intercepts are both zero.