MHT CET · Maths · Definite Integration
\(\int_{-2}^{2.24}[x] d x=\)
where \([x]\) is the greatest integer function
- A 2
- B 4
- C \(-2\)
- D 0
Answer & Solution
Correct Answer
(C) \(-2\)
Step-by-step Solution
Detailed explanation
(D)
\(\int_{-2}^{2}[\mathrm{x}] \mathrm{dx} =\int_{-2}^{-1}-2 \mathrm{dx}+\int_{-1}^{0}-1 \mathrm{dx}+\int_{0}^{1} 0 \mathrm{dx}+\int_{1}^{2} 1 \mathrm{dx} \)
\( =-2[\mathrm{x}]_{-2}^{-1}+(-1)[\mathrm{x}]_{-1}^{0}+1[\mathrm{x}]_{1}^{2} \)
\( =-2[-1-(-2)]-1[-(-1)]+1[2-1] \)
\( =-2[1]-1[1]+1[1]=-2-1+1=-2\)
\(\int_{-2}^{2}[\mathrm{x}] \mathrm{dx} =\int_{-2}^{-1}-2 \mathrm{dx}+\int_{-1}^{0}-1 \mathrm{dx}+\int_{0}^{1} 0 \mathrm{dx}+\int_{1}^{2} 1 \mathrm{dx} \)
\( =-2[\mathrm{x}]_{-2}^{-1}+(-1)[\mathrm{x}]_{-1}^{0}+1[\mathrm{x}]_{1}^{2} \)
\( =-2[-1-(-2)]-1[-(-1)]+1[2-1] \)
\( =-2[1]-1[1]+1[1]=-2-1+1=-2\)
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