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If y = `sqrt(tan x + sqrt(tanx + sqrt(tanx + .... + ∞)`, then show that `dy/dx = (sec^2x)/(2y - 1)`.
Find `dy/dx` at x = 0.
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Find the particular solution of the differential equation `dy/dx` = e2y cos x, when x = `π/6`, y = 0
Concept: undefined >> undefined
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Let f(x) = x3 – 6x2 + 9x + 18, then f(x) is strictly increasing in ______.
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The function f(x) = sin4x + cos4x is an increasing function if ______.
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Verify that y sec x = tan x + c is a solution of the differential equation `dy/dx + y tan x` = sec x.
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Solution of differential equation `e^(x - 2y) = dy/dx` is ______.
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Solution of the differential equation `dy/dx = (xy^2 + x)/(x^2y + y)` is ______.
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Find the general solution of the differential equation `tan y * dy/dx = sin(x + y) - sin(x - y)`.
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Find the values of x for which the function f(x) = `x/(x^2 + 1)` is strictly decreasing.
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Solution of the differential equation `(x + y dy/dx)(x^2 + y^2)` = 1, is ______.
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If y = `(x + sqrt(x^2 - 1))^m`, show that `(x^2 - 1)(d^2y)/(dx^2) + xdy/dx` = m2y
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Solve:
`1 + (dy)/(dx) = cosec (x + y)`; put x + y = u.
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Examine the maxima and minima of the function f(x) = 2x3 - 21x2 + 36x - 20 . Also, find the maximum and minimum values of f(x).
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Show that the points (1, 1, 1) and (-3, 0, 1) are equidistant from the plane `bar r (3bari+4barj-12bark)+13=0`
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If `f'(x)=k(cosx-sinx), f'(0)=3 " and " f(pi/2)=15`, find f(x).
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Find the approximate value of cos (89°, 30'). [Given is: 1° = 0.0175°C]
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Show that the height of the cylinder of maximum volume, that can be inscribed in a sphere of radius R is `(2R)/sqrt3.` Also, find the maximum volume.
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Find the equation of the planes parallel to the plane x + 2y+ 2z + 8 =0 which are at the distance of 2 units from the point (1,1, 2)
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An open box is to be made out of a piece of a square card board of sides 18 cms by cutting off equal squares from the comers and turning up the sides. Find the maximum volume of the box.
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Show that the altitude of the right circular cone of maximum volume that can be inscribed in a sphere of radius r is `(4r)/3`. Also find maximum volume in terms of volume of the sphere
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