Find the numerical equivalent of 3 to the 9th power times 3 -5 to the power
To find the numerical equivalent of this expression, we need to calculate each part of it separately.
First, let's calculate 3 to the power of 9: 3^9 = 19683.
Next, let's calculate -5 to the power of 2: (-5)^2 = 25.
Finally, let's multiply the two results: 19683 * 25 = 492075.
Therefore, the numerical equivalent of the given expression is 492075.
To find the numerical equivalent of 3 to the 9th power times 3 to the power of -5, we can use the properties of exponents.
First, let's simplify the exponents separately.
3 to the 9th power can be calculated as 3^9 = 19683.
3 to the power of -5 can be calculated as 1/ (3^5) = 1/243.
Now, to find the numerical equivalent of multiplying these two values, we simply multiply them together:
19683 * (1/243) = 81.
Therefore, the numerical equivalent of 3 to the 9th power times 3 to the power of -5 is 81.