what is the missing exponent in the following equation h^450=h^215
To find the missing exponent, we can set the two expressions equal to each other and solve for the missing exponent.
h^450 = h^215
Now, we can solve for h by equating the exponents:
450 = 215 + missing exponent
We can simplify the equation:
missing exponent = 450 - 215
By subtracting, we determine:
missing exponent = 235
To find the missing exponent in the equation h^450 = h^215, we can equate the bases and set the exponents equal to each other:
450 = 215
To solve for the missing exponent, we can subtract 215 from both sides of the equation:
450 - 215 = 215 - 215
This simplifies to:
235 = 0
Since we ended up with the equation 235 = 0, which is not true, it means that there is no missing exponent that would make the equation h^450 = h^215 valid.
To find the missing exponent in the equation h^450 = h^215, we can use the property of exponentiation that says if two powers with the same base are equal, then their exponents must be equal as well.
In this case, we have h^450 on the left-hand side and h^215 on the right-hand side. Since the base h is the same on both sides, we can conclude that the exponents must be equal.
So, to find the missing exponent, we can set up an equation: 450 = 215.
To solve this equation, we need to isolate the variable. We can do this by subtracting 215 from both sides:
450 - 215 = 215 - 215
235 = 0
This is not a valid equation, and we have obtained a contradiction.
Therefore, there is no missing exponent that would make the equation h^450 = h^215 true.