Wells Thornton
09/13/2024 · High School
\( P=2(w+h) \) \( w=12 \) correct to the nearest whole number. \( h=4 \) correct to the nearest whole number. Work out the upper bound for the value of \( P \).
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Step-by-step Solution
Given:
\( P = 2(w+h) \)
\( w = 12 \)
\( h = 4 \)
To find the upper bound for the value of \( P \), we need to substitute the values of \( w \) and \( h \) into the equation for \( P \) and then calculate the upper bound.
Substitute the values of \( w \) and \( h \) into the equation for \( P \):
\( P = 2(12 + 4) \)
\( P = 2(16) \)
\( P = 32 \)
Therefore, the value of \( P \) is 32. Since we are looking for the upper bound, the upper bound for the value of \( P \) is 32.
Quick Answer
The upper bound for \( P \) is 32.
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