Let f : R -> R be a function defined by f(x) = Then which of the following is NOT true?
Let f : R -> R be a function defined by f(x) = Then which of the following is NOT true?
option (C) is incorrect, there will be minima.
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Similar Questions for you
|x|- 1| is not differentiable at x = -1, 0, 1
|cospx| is not differentiable at x = -
(a + √2bcosx) (a - √2bcosy) = a² - b²
⇒ a² - √2abcosy + √2abcosx - 2b²cosxcosy = a² - b²
Differentiating both sides:
0 - √2ab (-siny dy/dx) + √2ab (-sinx) - 2b² [cosx (-siny dy/dx) + cosy (-sinx)] = 0
At (π/4, π/4):
ab dy/dx - ab - 2b² (-1/2 dy/dx + 1/2) = 0
⇒ dy/dx = (ab+b²)/ (ab-b²) = (a+b)/ (a-b); a,
For x>2, f (x) = ∫? ¹ (5+1-t)dt + ∫? ² (5+t-1)dt + ∫? (5+t-1)dt
= ∫? ¹ (6-t)dt + ∫? ² (4+t)dt + ∫? (4+t)dt
= [6t-t²/2]? ¹ + [4t+t²/2]? ² + [4t+t²/2]?
= (6-1/2) + (8+2 - (4+1/2) + (4x+x²/2 - (8+2)
= 5.5 + 5.5 + 4x+x²/2 - 10 = 4x+x²/2 + 1.
f (2? ) = 8+2+1 = 11. f (2? ) = 5 (2)+1 = 11. Continuous.
f' (x) =
81. Given, yx = xy
Taking log,
x log y .log x
Differentiating w r t ‘x’ we get,
80. Given, xy + yx = 1
Let 4 = xy and v =., we have,
u + v = 1.
___ (1)
So, u = xy
= log u = y log x(taking log)
Now, differentiating w r t ‘x’,
= xy- 1y + xy log x
And v = yx.
log v = x log y.
Differentiating w r t ‘x’,
= yx- 1. + yx log y.
So, eqn (1) becomes
xy- 1y + xy log x
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Maths Continuity and Differentiability 2025
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