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Question
Let f(x)=(1−cos xx2, if x≠01, if x=0. Which of the following is/are true?
Let f(x)=(1−cos xx2, if x≠01, if x=0. Which of the following is/are true?
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Solution
The correct option is C limx→0 f(x) exists.
f(x)=(1−cos xx2, if x≠01, if x=0(LHL at x=0)=limx→0− f(x)=limh→0 f(0−h)=limh→0 1−cos (−h)(−h)2=limh→0 1−cos (h)h2=limh→0 2 sin2 (h2)h2=limh→0 2 sin2 (h2)4(h2)2=12limh→0 ⎛⎜⎝sin (h2)(h2)⎤⎥⎦2=12(RHL at x=0)=limx→0+ f(x)=limh→0 f(0+h)=limh→0 1−cos hh2=limh→0 2 sin2 (h2)h2=limh→0 2 sin2 (h2)4(h2)2=12limh→0 ⎛⎜⎝sin (h2)(h2)⎤⎥⎦2=12(LHL at x=0)=(RHL at x=0)≠f(0)∴limx→0 f(x) exists.∴f(x) has removable discontinuity at x=0.f(x) will be continuous if f(0)=12
f(x)=(1−cos xx2, if x≠01, if x=0(LHL at x=0)=limx→0− f(x)=limh→0 f(0−h)=limh→0 1−cos (−h)(−h)2=limh→0 1−cos (h)h2=limh→0 2 sin2 (h2)h2=limh→0 2 sin2 (h2)4(h2)2=12limh→0 ⎛⎜⎝sin (h2)(h2)⎤⎥⎦2=12(RHL at x=0)=limx→0+ f(x)=limh→0 f(0+h)=limh→0 1−cos hh2=limh→0 2 sin2 (h2)h2=limh→0 2 sin2 (h2)4(h2)2=12limh→0 ⎛⎜⎝sin (h2)(h2)⎤⎥⎦2=12(LHL at x=0)=(RHL at x=0)≠f(0)∴limx→0 f(x) exists.∴f(x) has removable discontinuity at x=0.f(x) will be continuous if f(0)=12
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