MHT CET · Maths · Definite Integration
\(\int_{0.2}^{3.5}[x] \mathrm{d} x=\)
(where \([x]=\) greatest integer not greater than \(x\) )
- A 4
- B 4.2
- C 4.5
- D 4.4
Answer & Solution
Correct Answer
(C) 4.5
Step-by-step Solution
Detailed explanation
\(\int_{0.2}^{3.5}[x] \mathrm{d} x =\int_{0.2}^1(0) \mathrm{d} x+\int_1^2(1) \mathrm{d} x+\int_2^3 2 \mathrm{~d} x~+\) \(\int_3^{3.5} 3 \mathrm{~d} x \)
\( =0+[x]_1^2+2[x]_2^3+3[x]_3^{3.5} \)
\( =0+(2-1)+2(3-2)+3(3.5-3) \)
\( =0+1+2+1.5 \)
\( =4.5\)
\( =0+[x]_1^2+2[x]_2^3+3[x]_3^{3.5} \)
\( =0+(2-1)+2(3-2)+3(3.5-3) \)
\( =0+1+2+1.5 \)
\( =4.5\)
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