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Maths NCERT Exemplar Solutions Class 11th Chapter Five Continuity Maths Continuity and Differentiability Maths Class 12th

Let f: R → R be defined as
f(x) = { λ|x²-5x+6| / µ(5x-x²-6), x<2; e^(tan(x-2))/(x-[x]), x>2; µ, x=2 }
where [x] is the greatest integer less than or equal to x. If f is continuous at x = 2, then λ + µ is equal to:

Option 1 -

e(1-e)

Option 2 -

e(e-2)

Option 3 -

2e-1

Option 4 -

7 Views | Posted a month ago

Asked by Shiksha User

1 Answer

Answered by

Raj Pandey | Contributor-Level 9

a month ago

Correct Option - 1

Detailed Solution:

LHL = lim (x→2? ) λ|x²-5x+6| / µ (5x-x²-6) = lim (x→2? ) -λ/µ
RHL = lim (x→2? ) e^ (tan (x-2)/ (x- [x]) = e¹
f (2) = µ
For continuity, -λ/µ = e = µ.
⇒ µ=e, -λ=µ²=e², λ=-e²
∴ λ + µ = -e² + e = e (1-e)

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$f (x) = {\begin{cases} \frac{l o g_{e} (1 - x + x^{2}) + l o g_{e} (1 + x + x^{2})}{s e c x - c o s x}, x \in (\frac{- π}{2}, \frac{π}{2}) - {0} \\ k, x = 0 \end{cases}$ for continuity at x = 0

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Let f(x) =
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RHL $\underset{x \to 0^{+}}{l i m} \frac{c o s^{- 1} (1 - x^{2}) s i n^{- 1} (1 - x)}{x - x^{3}}$

$\underset{x \to 0^{+}}{l i m} \frac{π}{2} \cdot \frac{c o s^{- 1} (1 - x^{2})}{x}$

$\frac{π}{2} \underset{x \to 0^{+}}{l i m} \frac{- 1}{\sqrt[]{{(1 - (1 - x^{2}))}^{2}}} (- 2 x)$

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LHL $\underset{x \to 0^{+}}{l i m} \frac{c o s^{- 1} (1 - {(1 + x)}^{2}) s i n^{- 1} (1 - (1 + x))}{1 \cdot (1 - {(1 + x)}^{2})}$

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Given $(x) = {\begin{cases} 2 s i n (\frac{- π x}{2}), x < - 1 \\ | a x^{2} + x + b |, - 1 \leq x \leq 1 \\ s i n π x, x > 1 \end{cases}$

If f (x) is continuous for all $x \in R$ then it should be continuous at x = 1 & x = -1

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Let f: R → R be defined as
f(x) = { λ|x²-5x+6| / µ(5x-x²-6), x<2; e^(tan(x-2))/(x-[x]), x>2; µ, x=2 }
where [x] is the greatest integer less than or equal to x. If f is continuous at x = 2, then λ + µ is equal to:

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Let f: R → R be defined asf(x) = { λ|x²-5x+6| / µ(5x-x²-6), x<2; e^(tan(x-2))/(x-[x]), x>2; µ, x=2 }where [x] is the greatest integer less than or equal to x. If f is continuous at x = 2, then λ + µ is equal to:

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Learn more about...

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Your Question

Let f: R → R be defined as
f(x) = { λ|x²-5x+6| / µ(5x-x²-6), x<2; e^(tan(x-2))/(x-[x]), x>2; µ, x=2 }
where [x] is the greatest integer less than or equal to x. If f is continuous at x = 2, then λ + µ is equal to: