If $[x]$ is the greatest integer function not greater than $x$ , then $\int_{0}^{11} [x] d x$ $=$

$45$

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$66$

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$35$

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$55$

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Solution

The correct option is D
$55$

Explanation for the correct answer:
The box function is defined as the greatest integer function
$[x] = \{\begin{cases} \begin{matrix} 0 & f o r & 0 \leq x < 1 \\ 1 & f o r & 1 \leq x < 2 \\ 2 & f o r & 2 \leq x < 3 \\ 3 & f o r & 3 \leq x < 4 \\ 4 & f o r & 4 \leq x < 5 \\ 5 & f o r & 5 \leq x < 6 \end{matrix} \\ \begin{matrix} 6 & f o r & 6 \leq x < 7 \\ 7 & f o r & 7 \leq x < 8 \\ 8 & f o r & 8 \leq x < 9 \\ 9 & f o r & 9 \leq x < 10 \\ 10 & f o r & 10 \leq x < 11 \end{matrix} \end{cases}$

Therefore from this information, the given integral can be split up into smaller integrals as
$\int_{0}^{11} [x] d x$ $=$ $\int_{0}^{1} [x] d x +$ $\int_{1}^{2} [x] d x +$ $\int_{2}^{3} [x] d x +$ $\int_{3}^{4} [x] d x +$ $\int_{4}^{5} [x] d x +$ $\int_{5}^{6} [x] d x +$ $\int_{6}^{7} [x] d x +$ $\int_{7}^{8} [x] d x +$ $\int_{8}^{9} [x] d x +$ $\int_{9}^{10} [x] d x +$ $\int_{10}^{11} [x] d x$ $. . . (i)$
$[x]$ is the greatest integer function, which gives the value of the greatest integer less than or equal to the number itself
Consider the interval $(0, 1)$
For all $x \in (0, 1)$ , $[x] = 0$
Similarly consider the interval $(1, 2)$
For all $x \in (1, 2)$ , $[x] = 1$ and so on
Using this $(i)$ can be written as
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $\int_{0}^{1} 0 d x +$ $\int_{1}^{2} 1 d x +$ $\int_{2}^{3} 2 d x +$ $\int_{3}^{4} 3 d x +$ $\int_{4}^{5} 4 d x +$ $\int_{5}^{6} 5 d x +$ $\int_{6}^{7} 6 d x +$ $\int_{7}^{8} 7 d x +$ $\int_{8}^{9} 8 d x +$ $\int_{9}^{10} 9 d x +$ $\int_{10}^{11} 10 d x$
We know that $\int d x = x$
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $0 + {(x)}_{1}^{2} + {(x)}_{2}^{3} + {(x)}_{3}^{4} + {(x)}_{4}^{5} + {(x)}_{5}^{6} + {(x)}_{6}^{7} + {(x)}_{7}^{8} + {(x)}_{8}^{9} + {(x)}_{9}^{10} + {(x)}_{10}^{11}$
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $0 + {(x)}_{1}^{2} + 2 {(x)}_{2}^{3} + 3 {(x)}_{3}^{4} + 4 {(x)}_{4}^{5} + 5 {(x)}_{5}^{6} + 6 {(x)}_{6}^{7} + 7 {(x)}_{7}^{8} + 8 {(x)}_{8}^{9} + 9 {(x)}_{9}^{10} + 10 {(x)}_{10}^{11}$
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $0 + (2 - 1) + 2 (3 - 2) + 3 (4 - 3) + 4 (5 - 4) + 5 (6 - 5) + 6 (7 - 6) + 7 (8 - 7) + 8 (9 - 8) + 9 (10 - 9) + 10 (11 - 10)$
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $0 + 1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10$
$\Rightarrow$ $\int_{0}^{11} [x] d x$ $=$ $55$
Hence, the value of the integral $\int_{0}^{11} [x] d x$ is $55$ , so option, (D) is the correct answer.

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