If \((11)^{3}\) is subtracted from \((46)^{2}\) what will be the remainder? (a) 787 (b) 785 (c) 781 (d) 783 (e) None of these
Solution To find out how many items a factory produces in a week (7 days), given that it produces 1515 items in 3 days, we can use a simple proportion: \[ \text{Items produced in 3 days : 3 days = Items produced in 7 days : 7 days} \] We can set up the equation as follows: \[ \frac{1515 \text{ itemsRead more
Solution
To find out how many items a factory produces in a week (7 days), given that it produces 1515 items in 3 days, we can use a simple proportion:
\[
\text{Items produced in 3 days : 3 days = Items produced in 7 days : 7 days}
\]
We can set up the equation as follows:
\[
\frac{1515 \text{ items}}{3 \text{ days}} = \frac{x \text{ items}}{7 \text{ days}}
\]
To find \(x\) (the number of items produced in 7 days), we solve for \(x\):
\[
x = \frac{1515 \times 7}{3}
\]
\[
x = \frac{10605}{3}
\]
\[
x = 3535 \text{ items}
\]
Therefore, the factory will produce 3535 items in a week.
The correct answer is (d) 3535.
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Solution To find the remainder when \((11)^3\) is subtracted from \((46)^2\), we first calculate each term: Calculating \((46)^2\) \[ (46)^2 = 2116 \] Calculating \((11)^3\) \[ (11)^3 = 1331 \] Now, subtracting \((11)^3\) from \((46)^2\): \[ 2116 - 1331 = 785 \] Therefore, the remainder when \((11)^Read more
Solution
To find the remainder when \((11)^3\) is subtracted from \((46)^2\), we first calculate each term:
Calculating \((46)^2\)
\[
(46)^2 = 2116
\]
Calculating \((11)^3\)
\[
(11)^3 = 1331
\]
Now, subtracting \((11)^3\) from \((46)^2\):
\[
2116 – 1331 = 785
\]
Therefore, the remainder when \((11)^3\) is subtracted from \((46)^2\) is 785.
The correct answer is (b) 785.
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