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Find the differential equation of all the parabolas with latus rectum '4a' and whose axes are parallel to x-axis.
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The distance moved by a particle travelling in straight line in t seconds is given by s = 45t + 11t2 − t3. The time taken by the particle to come to rest is
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The volume of a sphere is increasing at the rate of 4π cm3/sec. The rate of increase of the radius when the volume is 288 π cm3, is
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Show that the differential equation of which y = 2(x2 − 1) + \[c e^{- x^2}\] is a solution, is \[\frac{dy}{dx} + 2xy = 4 x^3\]
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If the rate of change of volume of a sphere is equal to the rate of change of its radius, then its radius is equal to
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If the rate of change of area of a circle is equal to the rate of change of its diameter, then its radius is equal to
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Each side of an equilateral triangle is increasing at the rate of 8 cm/hr. The rate of increase of its area when side is 2 cm, is
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If s = t3 − 4t2 + 5 describes the motion of a particle, then its velocity when the acceleration vanishes, is
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The equation of motion of a particle is s = 2t2 + sin 2t, where s is in metres and t is in seconds. The velocity of the particle when its acceleration is 2 m/sec2, is
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The radius of a circular plate is increasing at the rate of 0.01 cm/sec. The rate of increase of its area when the radius is 12 cm, is
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The diameter of a circle is increasing at the rate of 1 cm/sec. When its radius is π, the rate of increase of its area is
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A man 2 metres tall walks away from a lamp post 5 metres height at the rate of 4.8 km/hr. The rate of increase of the length of his shadow is
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A man of height 6 ft walks at a uniform speed of 9 ft/sec from a lamp fixed at 15 ft height. The length of his shadow is increasing at the rate of
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In a sphere the rate of change of volume is
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In a sphere the rate of change of surface area is
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A cylindrical tank of radius 10 m is being filled with wheat at the rate of 314 cubic metre per hour. Then the depth of the wheat is increasing at the rate of
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Form the differential equation representing the family of ellipses having centre at the origin and foci on x-axis.
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Form the differential equation of the family of hyperbolas having foci on x-axis and centre at the origin.
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Verify that y = 4 sin 3x is a solution of the differential equation \[\frac{d^2 y}{d x^2} + 9y = 0\]
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Show that the function y = A cos x + B sin x is a solution of the differential equation \[\frac{d^2 y}{d x^2} + y = 0\]
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