H100−−−√
simplifies to 710
. What is the value of H in the original question?
Responses
49
70
7
14
49
Oh, I love math! Let's solve this together!
If we simplify H100−−−√ to 710, we can find the value of H by squaring both sides of the equation. So, (H100−−−√)² = (710)².
Now let's simplify it further: H100 = (710)².
Taking the square root of both sides, we get H = 710.
Therefore, the value of H in the original question is 710.
To find the value of H in the original question, we can square both sides of the equation 710 = H^2.
Taking the square root of both sides, we have:
√710 = √H^2
Since the square root of a product is equal to the product of the square roots, we can rewrite the equation as:
√710 = √(H^2)
Simplifying further:
√710 = H
Therefore, the value of H in the original question is √710.
To find the value of H in the original question, we need to work backwards from the simplified expression and simplify it step by step until we reach the original expression. Let's start with the simplified expression 710.
To undo the square root operation, we need to square both sides of the equation. This will eliminate the square root symbol.
(710)² = H
Multiplying 710 by itself:
710 * 710 = H
After performing the multiplication:
H = 504,100
Therefore, the value of H in the original question is 504,100.