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प्रश्न
If f'(1) = 3 and f'(2) = 2, then the value of `lim_(h→0) (f(1 + 2h) - f(1))/(f(2 + 3h) - f(2))` is equal to ______.
पर्याय
0.00
1.00
2.00
3.00
MCQ
रिकाम्या जागा भरा
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उत्तर
If f'(1) = 3 and f'(2) = 2, then the value of `lim_(h→0) (f(1 + 2h) - f(1))/(f(2 + 3h) - f(2))` is equal to 1.00.
Explanation:
`lim_(h→0) (f(1 + 2h) - f(1))/(f(2 + 3h) - f(2)) = lim_(h→0) (f^'(1 + 2h).2)/(f^'(2 + 3h).3)`
= `2/3.(f^'(1))/(f^'(2))`
= 1
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Limits Using L-hospital's Rule
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