To solve the equation \( x^2 = 10^{10} \) using inspection, we can take the square root of both sides.
Taking the square root gives us:
\[ x = \pm 10^5 \]
This means that both \( 10^5 \) and \( -10^5 \) are solutions to the equation.
Now let's check the provided options:
- {10^5} – This only includes the positive solution.
- {-5^5} – This is incorrect because \( -5^5 = -3125 \) does not satisfy the equation.
- {-5^{10}, 5^{10}} – This is incorrect because \( -5^{10} \) and \( 5^{10} = 10^{10} \) doesn't represent our solutions.
- {-10^5, 10^5} – This correctly includes both solutions \( -10^5 \) and \( 10^5 \).
Thus, the correct solution set is:
\[ {-10^5, 10^5} \]
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