In interval [- 2 , 2 ], Find the difference in maximum value and minimum value of function f(x)= 2 x-x.

Given function f(x)= 2 x-x So, f^ (x)=2 2 x-1 For finding critical values : rlrl & & f^ (x) & =0 & 2 2 x-1 & =0 & & 2 x & =1 2 & & 2 x & =- 3 , 3 & & x & =- 6 , 6 now f (- 2 ) & = (- )- (- 2 ) & =- + 2 = 2 f (- 6 ) & = - 3 + 6 = -3 2 + 6 f ( 6 ) & = 3 - 6 = 3 2 - 6 and f ( 2 ) & = - 2 =- 2 Maximum value = 2 and minimum value =- 2 Hence such difference = 2 - (- 2 )=

In interval [- 2 , 2 ], Find the difference in maximum value and …

Let T be the set of all triangles in the Euclidean plane, and let a relation R on T be defined as aRb if a is congruent to b for all a, b ∈ T. Then, R is:

Reflexive but not symmetric.
Transitive but not symmetric.
Equivalence.
None of these.

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Solve the following systems of homogeneous linear equations by matrix method:

$x + y + z = 0$

$x - y - 5z = 0$

$x + 2y + 4z = 0$

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Find the equation of the curve which passes through the point $(1, \frac{\pi}{4})$ and tangent at any point 0f which makes an angle $\tan^{-1}\Big(\frac{\text{y}}{\text{x}}-\cos^{2}\frac{\text{y}}{\text{x}}\Big)$ with x-axis.

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A shopkeeper has $3$ varieties of pens $'A', 'B'$ and $'C'$. Meenu purchased $1$ pen of each variety for a total of Rs $21$. Jeevan purchased $4$ pens of $'A'$ variety $3$ pens of $'B'$ variety and $2$ pens of $'C'$ variety for Rs $60$. While Shikha purchased $6$ pens of $'A'$ variety, $2$ pens of $'B'$ variety and $3$ pens of $'C'$ variety for Rs $70$. Using matrix method, find cost of each variety of pen.

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The rate of increase of bacteria in a culture is proportional to the number of bacteria present and it is found that the number doubles in 6 hours. Prove that the bacteria becomes 8 times at the end of 18 hours.

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Differentiate the following functions with respect to x:
$\frac{\sqrt{\text{x}^2+1}+\sqrt{\text{x}^2-1}}{\sqrt{\text{x}^2+1}-\sqrt{\text{x}^2-1}}$

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Maximize Z = 3x + 3y, if possible,
Subject to the constraints
$\text{x}-\text{y}\leq1$
$\text{x}+\text{y}\geq3$
$\text{x},\text{y}\geq0$

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Two factories decided to award their employees for three values of (a) adaptable to new techniques, (b) careful and alert in difficult situations and (c) keeping clam in tense situations, at the rate of ₹ x, ₹ y and ₹ z per person respectively. The first factory decided to honuor respectively 2, 4 and 3 employees with a total prize money of ₹ 29000. The second factory decided to honuor respectively 5, 2 and 3 employees with the prize money of ₹ 30500. If the three prizes per person together cost ₹ 9500, then

Represent the above situation by matrix equation and form linear equation using matrix multiplication.
Solve this equation by matrix method.
Which values are reflected in the questions?

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Differentiate the following functions with respect to x:
$\sin^{-1}\Big(\frac{1}{\sqrt{1+\text{x}^2}}\Big)$

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Differentiate the following functions with respect to x:
$\tan^{-1}\Big(\frac{\sqrt{1+\text{a}^2\text{x}^2-1}}{\text{ax}}\Big),\text{x}\neq0$

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