Exams › JEE Main › Maths
Find the real value of m for which the substitution y = u^m converts the differential equation 2x⁴ y (dy/dx) + y⁴ = 4x⁶ into a homogeneous differential equation.
- m = 0
- m = 1
- m = 3/2
- no value of m
Correct answer: m = 3/2
Solution
After substitution the three terms have degrees 2m+3, 4m and 6; setting them equal gives m = 3/2, making the equation homogeneous.
Related JEE Main Maths questions
- If √(1-x²ⁿ)+√(1-y²ⁿ)=a(xⁿ-yⁿ), then the value of (√(1-x²ⁿ) dy)/(√(1-y²ⁿ) dx) is
- For a curve that passes through the point (4, 0), the slope is governed by
dy/dx = y/x + 5x/((x + 2)(x − 3)).
If the point (5, a) lies on this curve, what is the value of a?
- Which differential equation represents the family of all conics whose axes are aligned with the coordinate axes?
- Find the equation of the curve that satisfies (xy - x²) (dy)/(dx) = y² and passes through the point (-1, 1).
- For the differential equation y = y/x + x/y, if its general solution is written as y = x / log|Cx|, then the function φ(x/y) is
- For the differential equation dy/dx = [y f'(x) − y²]/f(x), where f(x) is a specified function, the solution is
⚔️ Practice JEE Main Maths free + battle 1v1 →