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Using integration, find the area of the region {(x, y) : x2 + y2 ≤ 1 ≤ x + y}.
Concept: Area Under Simple Curves
Find the area of the smaller region bounded by the ellipse \[\frac{x^2}{9} + \frac{y^2}{4} = 1\] and the line \[\frac{x}{3} + \frac{y}{2} = 1 .\]
Concept: Area Under Simple Curves
Find the area of the region.
{(x,y) : 0 ≤ y ≤ x2 , 0 ≤ y ≤ x + 2 ,-1 ≤ x ≤ 3} .
Concept: Area Under Simple Curves
Using integration find the area of the triangle formed by negative x-axis and tangent and normal to the circle `"x"^2 + "y"^2 = 9 "at" (-1,2sqrt2)`.
Concept: Area Under Simple Curves
Find the particular solution of the differential equation `e^xsqrt(1-y^2)dx+y/xdy=0` , given that y=1 when x=0
Concept: General and Particular Solutions of a Differential Equation
Write the degree of the differential equation `x^3((d^2y)/(dx^2))^2+x(dy/dx)^4=0`
Concept: Order and Degree of a Differential Equation
Show that the differential equation 2yx/y dx + (y − 2x ex/y) dy = 0 is homogeneous. Find the particular solution of this differential equation, given that x = 0 when y = 1.
Concept: Methods of Solving Differential Equations> Homogeneous Differential Equations
Form the differential equation of the family of circles in the second quadrant and touching the coordinate axes.
Concept: General and Particular Solutions of a Differential Equation
Solve the differential equation :
`y+x dy/dx=x−y dy/dx`
Concept: Methods of Solving Differential Equations> Homogeneous Differential Equations
Find the differential equation representing the curve y = cx + c2.
Concept: General and Particular Solutions of a Differential Equation
Show that the differential equation `2xydy/dx=x^2+3y^2` is homogeneous and solve it.
Concept: Methods of Solving Differential Equations> Homogeneous Differential Equations
Find the particular solution of differential equation:
`dy/dx=-(x+ycosx)/(1+sinx) " given that " y= 1 " when "x = 0`
Concept: General and Particular Solutions of a Differential Equation
Find the particular solution of the differential equation `(1+x^2)dy/dx=(e^(mtan^-1 x)-y)` , give that y=1 when x=0.
Concept: General and Particular Solutions of a Differential Equation
Find the particular solution of the differential equation dy/dx=1 + x + y + xy, given that y = 0 when x = 1.
Concept: General and Particular Solutions of a Differential Equation
Find the particular solution of the differential equation log(dy/dx)= 3x + 4y, given that y = 0 when x = 0.
Concept: General and Particular Solutions of a Differential Equation
Find the particular solution of the differential equation x (1 + y2) dx – y (1 + x2) dy = 0, given that y = 1 when x = 0.
Concept: General and Particular Solutions of a Differential Equation
Which of the following is a homogeneous differential equation?
Concept: Methods of Solving Differential Equations> Homogeneous Differential Equations
if `y = sin^(-1) (6xsqrt(1-9x^2))`, `1/(3sqrt2) < x < 1/(3sqrt2)` then find `(dy)/(dx)`
Concept: General and Particular Solutions of a Differential Equation
Find the particular solution of the differential equation
`tan x * (dy)/(dx) = 2x tan x + x^2 - y`; `(tan x != 0)` given that y = 0 when `x = pi/2`
Concept: General and Particular Solutions of a Differential Equation
Solve the following differential equation:
\[\text{ cosec }x \log y \frac{dy}{dx} + x^2 y^2 = 0\]
Concept: Basic Concepts of Differential Equations
