What are the continuity criteria to keep enjoying scholarships in higher semesters at Manipal University Jaipur BTech?

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Rashmi Karan | Contributor-Level 9

2 hours ago

Manipal University Jaipur BTech scholarship holders must maintain clean academic records to continue their benefits annually. For the TMA Pai scheme, students must secure a CGPA of 8.0 or above every year. Other scholarship schemes like the Visvesvaraya award require a minimum CGPA of 7.0 consistent

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If $f (x) = \frac{(2^{x} + 2^{- x}) (t a n x) \sqrt[]{t a n^{- 1} (2 x^{2} - 3 x + 1)}}{{(7 x^{2} - 3 x + 1)}^{3}}$ , then f′(0) is equal to

Alok Kumar Singh

$f (x) = \frac{(2^{x} + 2^{- x}) t a n x \sqrt[]{t a n^{- 1} (2 x^{2} - 3 x + 1)}}{{(7 x^{2} - 3 x + 1)}^{3}}$

$f (x) = (2^{x} + 2^{- x}) . t a n x . \sqrt[]{t a n^{- 1} (2 x^{2} - 3 x + 1)} . {(7 x^{2} - 3 x + 1)}^{- 3}$

$f' (x) = (2^{x} + 2^{- x}) . s e c^{2} x . \sqrt[]{t a n^{- 1} (2 x^{2} - 3 x + 1)} . {(7 x^{2} - 3 x + 1)}^{- 3} + t a n x . (Q (x))$

$f' (0) = 2.1 \sqrt[]{\frac{π}{4}} . 1$

$= \sqrt[]{π}$

$\underset{x \to 0}{l i m} \frac{c o s^{- 1} (1 - {x}^{2}) s i n^{- 1} (1 - {x})}{{x} - {x}^{3}}$ , where {} is fractional part function.

If L .H.L = L and R.H. L = R, then the correct relation between L and R is

Alok Kumar Singh

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

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

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

$= \frac{π}{2} \underset{x \to 2^{+}}{l i m} \frac{2 x}{\sqrt[]{2 x^{2} - x^{4}}} = π \underset{x \to 0^{+}}{l i m} \frac{x}{x \sqrt[]{2 - x^{2}}}$

$= \frac{π}{\sqrt[]{2}}$

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

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

$= \frac{π}{2} \underset{x \to 0^{-}}{l i m} \frac{- s i n^{- 1} x}{- x (x + 2)} = \frac{π}{2} \times \frac{1}{2} = \frac{π}{2}$

Alok Kumar Singh

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

At x = -1, L.H.L = R.H.L. Þ 2 = |a + b - 1|

->a + b – 3 = 0 OR a + b + 1 = 0 . (i)

-> a + b + 1 = 0 . (ii)

(i) & (ii), a + b =-1

Alok Kumar Singh

Given f(x) = $\int_{e}^{x} e^{t} f (t) d t + e^{x} . . . . . . . . . . (i)$

using Leibniz rule then

f’(x) = e^xf(x) + e^x

_{$\Rightarrow \frac{d y}{d x} = e^{x} y + e^{x} w h e r e y = f (x) t h e n \frac{d y}{d x} = f' (x)$}

P = -e^x, Q = e^x

Solution be y. (I.F.) = $\int Q (I . F .) d x + c$

I. f. = $e^{\int - e^{x} d x = e^{- e^{x}}}$

$\Rightarrow y . (e^{- e^{x}}) = \int e^{x} . e^{- e^{x}} d x + c$

$y . e^{- e^{x}} = - \int d t + c = - t + c = - e^{- e^{x}} + c . . . . . . . . . . (i i)$

Put x =

Vishal Baghel

f (x) is an even function

$f (- \frac{1}{4}) = f (- \frac{1}{2}) = f (\frac{1}{2}) = f (\frac{1}{4}) = 0$

So, f (x) has at least four roots in (-2, 2)

$g (\frac{- 3}{4}) = g (\frac{3}{4}) = 0$

So, g (x) has at least two roots in (-2, 2)

now number of roots of f (x) $\cdot g " (x) = f' (x) \cdot g' (x) = 0$

It is same as number of roots of $\frac{d}{d x} (f (x) \cdot g' (x)) = 0$ will have atleast 4 roots in (-2, 2)

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