jee-advanced 2000 Q14

jee-advanced · India · screening Sine and Cosine Rules Integral Inequalities and Limit of Integral Sequences

14. Let $\mathrm { g } ( \mathrm { x } ) = \int 0 \mathrm { x } f ( t ) \mathrm { dt }$, where f is such that $1 / 2 \leq f ( t ) \leq 1$ for $\mathrm { t } \in [ 0,1 ]$ and $0 \leq f ( t ) \leq 1 / 2$ for $\mathrm { t } \in [ 1,2 ]$. Then $\mathrm { g } ( 2 )$ satisfies the inequality:
(A) $- 3 / 2 \leq g ( 2 ) < 1 / 2$
(B) $0 \leq g ( 2 ) < 2$
(C) $3 / 2 < g ( 2 ) \leq 5 / 2$
(D) $2 < g ( 2 ) < 4$

14. Let $\mathrm { g } ( \mathrm { x } ) = \int 0 \mathrm { x } f ( t ) \mathrm { dt }$, where f is such that $1 / 2 \leq f ( t ) \leq 1$ for $\mathrm { t } \in [ 0,1 ]$ and $0 \leq f ( t ) \leq 1 / 2$ for $\mathrm { t } \in [ 1,2 ]$. Then $\mathrm { g } ( 2 )$ satisfies the inequality:\\
(A) $- 3 / 2 \leq g ( 2 ) < 1 / 2$\\
(B) $0 \leq g ( 2 ) < 2$\\
(C) $3 / 2 < g ( 2 ) \leq 5 / 2$\\
(D) $2 < g ( 2 ) < 4$\\

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