Advertisements
Advertisements
Find the particular solution of the differential equation `(x - y) dy/dx = (x + 2y)` given that y = 0 when x = 1.
Concept: Homogeneous Differential Equations
Find `(dy)/(dx)` at x = 1, y = `pi/4` if `sin^2 y + cos xy = K`
Concept: General and Particular Solutions of a Differential Equation
Prove that x2 – y2 = c(x2 + y2)2 is the general solution of the differential equation (x3 – 3xy2)dx = (y3 – 3x2y)dy, where C is parameter
Concept: Homogeneous Differential Equations
The integrating factor of the differential equation \[\left( 1 - y^2 \right)\frac{dx}{dy} + yx = ay\left( - 1 < y < 1 \right)\] is ______.
Concept: Differential Equations
Form the differential equation representing the family of curves `y2 = m(a2 - x2) by eliminating the arbitrary constants 'm' and 'a'.
Concept: Procedure to Form a Differential Equation that Will Represent a Given Family of Curves
Solve the differential equation: ` (dy)/(dx) = (x + y )/ (x - y )`
Concept: Homogeneous Differential Equations
Form the differential equation representing the family of curves y = e2x (a + bx), where 'a' and 'b' are arbitrary constants.
Concept: Procedure to Form a Differential Equation that Will Represent a Given Family of Curves
Find the particular solution of the differential equation `x (dy)/(dx) - y = x^2.e^x`, given y(1) = 0.
Concept: General and Particular Solutions of a Differential Equation
Find the general solution of the differential equation `x (dy)/(dx) = y(logy - logx + 1)`.
Concept: General and Particular Solutions of a Differential Equation
Find the general solution of the differential equation:
`log((dy)/(dx)) = ax + by`.
Concept: General and Particular Solutions of a Differential Equation
Degree of the differential equation `sinx + cos(dy/dx)` = y2 is ______.
Concept: Order and Degree of a Differential Equation
Find the general solution of the differential equation:
(xy – x2) dy = y2 dx
Concept: Homogeneous Differential Equations
The sum of the order and the degree of the differential equation `d/dx[(dy/dx)^3]` is ______.
Concept: Order and Degree of a Differential Equation
Prove that, for any three vector `veca,vecb,vecc [vec a+vec b,vec b+vec c,vecc+veca]=2[veca vecb vecc]`
Concept: Scalar Triple Product
Show that the points A, B, C with position vectors `2hati- hatj + hatk`, `hati - 3hatj - 5hatk` and `3hati - 4hatj - 4hatk` respectively, are the vertices of a right-angled triangle. Hence find the area of the triangle
Concept: Introduction of Product of Two Vectors
If `veca, vecb, vecc` are mutually perpendicular vectors of equal magnitudes, find the angle which `veca + vecb + vecc`make with `veca or vecb or vecc`
Concept: Magnitude and Direction of a Vector
Using vectors find the area of triangle ABC with vertices A(1, 2, 3), B(2, −1, 4) and C(4, 5, −1).
Concept: Vectors Examples and Solutions
If the sum of two unit vectors is a unit vector prove that the magnitude of their difference is `sqrt(3)`.
Concept: Magnitude and Direction of a Vector
Find a unit vector perpendicular to both the vectors `veca and vecb` , where `veca = hat i - 7 hatj +7hatk` and `vecb = 3hati - 2hatj + 2hatk` .
Concept: Multiplication of Vectors >> Vector (Or Cross) Product of Two Vectors
Show that the vectors `hat (i) - 2 hat(j) + 3 hat (k), - 2 hat(i) + 3 hat(j) - 4 hat(k) " and " hat(i) - 3 hat(j) + 5 hat(k) ` are coplanar.
Concept: Scalar Triple Product
