JEE Main Differential Equations 2027 — Order, Degree, Linear & Variable Separable: Complete Notes and 35 Practice Problems

Last Updated: April 2026

JEE Main differential equations 2027 aspirants — Differential Equations carries an average of 2 questions (8 marks) in JEE Main every shift, per NTA’s January 2026 chapter-wise analysis. Combined with Calculus topics (limits, continuity, integration), it forms ~22% of the maths paper. The 2026 January session featured 4 problems on first-order ODEs across the 6 shifts. JEE Main cut-off (general) for 2026 was 93.23 percentile — every chapter matters. This guide covers order, degree, variable separable, homogeneous, linear, Bernoulli, exact ODEs, and 35 worked problems.

1. Definition, Order and Degree

A differential equation contains derivatives of a dependent variable with respect to one or more independent variables.

• Order = the order of the highest derivative present.
• Degree = the power of the highest-order derivative when the equation is expressed as a polynomial in derivatives (radicals/fractions of derivatives must be cleared first).

Example: (d²y/dx²)³ + (dy/dx)⁴ = sin x → order 2, degree 3.

Worked Example 1

Q. Find order and degree of (d²y/dx²) + 5(dy/dx) + 6y = 0.
Sol. Highest derivative = d²y/dx² → order 2. It appears to power 1 → degree 1. Linear, homogeneous, second-order.

2. Formation of Differential Equation

If a family of curves contains n arbitrary constants, the differential equation eliminating them has order n.

Worked Example 2

Q. Form ODE for y = a sin x + b cos x.
Sol. Two constants → order 2. dy/dx = a cos x − b sin x. d²y/dx² = −a sin x − b cos x = −y → d²y/dx² + y = 0.

3. Variable Separable ODEs

Form: dy/dx = f(x)·g(y). Separate: dy/g(y) = f(x) dx, then integrate.

Worked Example 3

Q. Solve dy/dx = (1 + x)(1 + y²).
Sol. dy/(1+y²) = (1+x) dx. Integrate: arctan y = x + x²/2 + c. y = tan(x + x²/2 + c).

Worked Example 4

Q. Solve dy/dx = e^(x−y).
Sol. dy/dx = e^x·e^(−y) → e^y dy = e^x dx → e^y = e^x + c.

4. Homogeneous ODE

Form: dy/dx = F(y/x) where F is homogeneous of degree 0. Substitute y = vx → dy/dx = v + x(dv/dx). Reduces to variable separable in v and x.

Worked Example 5

Q. Solve dy/dx = (x + y)/x.
Sol. dy/dx = 1 + y/x. Put y = vx → v + x(dv/dx) = 1 + v → x(dv/dx) = 1 → dv = dx/x → v = ln|x| + c → y = x ln|x| + cx.

5. Linear First-Order ODE

Standard form: dy/dx + P(x)y = Q(x). Integrating factor IF = e^∫P dx. Solution: y·IF = ∫(Q·IF) dx + c.

Worked Example 6

Q. Solve dy/dx + y/x = x².
Sol. P = 1/x → IF = e^(ln x) = x. Solution: y·x = ∫x²·x dx = x⁴/4 + c → y = x³/4 + c/x.

Worked Example 7

Q. Solve dy/dx + 2y = e^(−x), y(0) = 1.
Sol. IF = e^(2x). y·e^(2x) = ∫e^(−x)·e^(2x) dx = ∫e^x dx = e^x + c → y = e^(−x) + c·e^(−2x). y(0)=1 → 1 = 1 + c → c=0. y = e^(−x).

6. Bernoulli’s Equation

Form: dy/dx + Py = Qy^n (n ≠ 0,1). Divide by y^n, substitute v = y^(1−n) → dv/dx + (1−n)P·v = (1−n)Q (linear in v).

Worked Example 8

Q. Solve dy/dx + y = xy².
Sol. Bernoulli, n = 2. Divide by y²: y^(−2) dy/dx + y^(−1) = x. Put v = y^(−1) → dv/dx = −y^(−2) dy/dx. Equation becomes −dv/dx + v = x → dv/dx − v = −x. IF = e^(−x). v·e^(−x) = ∫−x·e^(−x) dx = (x+1)e^(−x) + c → 1/y = (x+1) + ce^x.

7. Exact Differential Equations

Form: M(x,y) dx + N(x,y) dy = 0 is exact iff ∂M/∂y = ∂N/∂x. Solution: ∫M dx (treating y constant) + ∫(terms of N free of x) dy = c.

8. Standard Forms — Master Table

9. 35 JEE Practice Problems (Selected with Solutions)

1. Q1. dy/dx = y/x → y = cx (variable separable).
2. Q2. dy/dx + y tan x = sec x. IF = sec x. y·sec x = ∫sec²x dx = tan x + c → y = sin x + c cos x.
3. Q3. Order and degree of [1 + (dy/dx)²]^(3/2) = d²y/dx². Square both sides: order 2, degree 2.
4. Q4. dy/dx = (x²+y²)/(2xy). Homogeneous. y=vx → v+x(dv/dx) = (1+v²)/(2v) → x(dv/dx) = (1−v²)/(2v) → 2v dv/(1−v²) = dx/x → −ln|1−v²| = ln|x| + c → x²−y² = c·x.
5. Q5. dy/dx + y cot x = 2 cos x. IF = sin x. y sin x = ∫2 cos x sin x dx = sin²x + c.
6. Q6. y = e^x(c₁ + c₂x) → ODE is y” − 2y’ + y = 0 (order 2).
7. Q7. Solve x dy − y dx = √(x²+y²) dx. Homogeneous: y = vx → x(dv·x + v dx) − vx dx = x√(1+v²) dx → x dv = √(1+v²) dx → ∫dv/√(1+v²) = ∫dx/x → sinh⁻¹(v) = ln|x| + c.
8. Q8. dy/dx = (3x+y+1)/(x−y+2). Lines intersect at (−3/4, 5/4)? Use shift x = X−3/4, y = Y+5/4 → reduces to homogeneous in X, Y.
9. Q9. Find IF of (1+y²) dx + (xy + y) dy = 0. Test exactness: M_y = 2y, N_x = y → not exact. Multiply by suitable IF (function of y).
10. Q10. y’ + 2y = sin x. IF = e^(2x). Solution: y = (2 sin x − cos x)/5 + ce^(−2x).
11. Q11. Population growth dN/dt = kN → N = N₀ e^(kt).
12. Q12. Newton’s law of cooling: dT/dt = −k(T − T_s) → T = T_s + (T₀ − T_s)e^(−kt).
13. Q13. dy/dx = sec(x+y). Put v = x+y → dv/dx = 1 + dy/dx = 1 + sec v → cos v dv/(1+cos v) = dx → integrate.
14. Q14. y dx − x dy + log x · dx = 0. Rewrite: dy/dx = y/x + (log x)/x. Linear. IF = 1/x. (y/x)’ = (log x)/x² → y/x = −(log x)/x − 1/x + c → y = −log x − 1 + cx.
15. Q15. Order of ODE of family y = (a + bx)e^x is 2 (two constants).
16. Q16. Slope of tangent = sum of coordinates → dy/dx = x + y → linear. IF = e^(−x). y e^(−x) = ∫x e^(−x) dx = −(x+1)e^(−x) + c → y = −(x+1) + ce^x.
17. Q17. dy/dx = e^(x+y) + e^(x)y² → after factoring: dy/dx = e^x(e^y + y²) — variable separable in some cases (this one isn’t strictly).
18. Q18. ODE for circles touching y-axis at origin: x² + y² = 2ax → 2x + 2y(dy/dx) = 2a; eliminate a: 2x + 2y·y’ = (x² + y²)/x → 2x²+2xy y’ = x² + y² → y’ = (y²−x²)/(2xy).
19. Q19. ODE of all parabolas y² = 4ax: differentiate → 2y y’ = 4a → a = y y’/2 → y² = 4·(y y’/2)·x = 2xy y’ → y = 2x y’.
20. Q20. Solve (1+x²) dy/dx + 2xy = 1/(1+x²). Linear. IF = (1+x²). y(1+x²) = ∫dx/(1+x²) = arctan x + c.
21. Q21. Family y = ce^(2x): dy/dx = 2ce^(2x) = 2y → dy/dx = 2y.
22. Q22. dy/dx = (y−x)/(y+x). Homogeneous; y=vx → integrate.
23. Q23. Mixing problem (salt in tank): dQ/dt = (rate in) − (rate out)·(Q/V). Linear ODE.
24. Q24. dy/dx = sin(x+y) + cos(x+y). Put v = x+y → dv/dx − 1 = sin v + cos v → separable in v.
25. Q25. 2y dx + x(1 + log y) dy = 0. Treat x as function of y: dx/dy + (1+log y)/(2y)·x = 0 → linear in x.
26. Q26. Verify y = sin x is solution of y” + y = 0: y” = −sin x → y” + y = 0. ✓
27. Q27. dy/dx + y = e^(−x). IF = e^x. y e^x = ∫e^(−x)·e^x dx = ∫dx = x + c → y = (x+c)e^(−x).
28. Q28. Tangent line at any point (x,y) to curve has slope x+y. Find curve through origin. From Q16: y = ce^x − (x+1); y(0)=0 → c=1. y = e^x − x − 1.
29. Q29. dy/dx = (y/x) + tan(y/x). Homogeneous → y=vx → v + x(dv/dx) = v + tan v → cot v dv = dx/x → ln|sin v| = ln|x| + c → sin(y/x) = cx.
30. Q30. Order of ODE of all conics with axes parallel to coordinate axes is 3 (3 parameters: a, b, focus).
31. Q31. Bacterial culture doubles every 5 hours. Time to triple? N = N₀e^(kt). 2 = e^(5k) → k = ln2/5. 3 = e^(kt) → t = 5 ln3/ln2 ≈ 7.92 hr.
32. Q32. dy/dx = y² − x²/(2xy) (homogeneous variant) — not the same as Q4; care with signs.
33. Q33. Orthogonal trajectories of y = cx² satisfy dy/dx = 2cx. Eliminate c: c = y/x². Slope of orthogonal: dy/dx = −1/(2y/x) = −x/(2y) → 2y dy = −x dx → y² + x²/2 = C.
34. Q34. y = x sin(log x + c). Differentiate: y’ = sin(…) + cos(…). Eliminate c → ODE.
35. Q35. dy/dx − y/x = (x+1)/x. Linear. IF = 1/x. y/x = ∫(x+1)/x² dx = ln|x| − 1/x + c → y = x ln|x| − 1 + cx.

10. JEE Main Strategy for Differential Equations

Memorise the 6-row table above — every JEE problem maps to exactly one method. Focus 60% prep on linear + variable separable + homogeneous (these account for 80%+ of JEE Main DE problems). Solve previous-year sets at JEE Gurukul Free Resources, follow our JEE 2027 roadmap, and join our maths intensives for live problem-solving.

FAQ

Q1. How do I quickly identify the type of ODE?

Check in this order: separable? linear? homogeneous? Bernoulli? exact? It nearly always falls into one of these in JEE Main.

Q2. What’s the difference between order and degree?

Order = highest derivative present. Degree = exponent of that highest derivative once the equation is rationalised (cleared of fractional powers / radicals of derivatives).

Q3. Are partial differential equations in JEE Main syllabus?

No — JEE Main covers only ordinary differential equations of first order and first degree (mostly), plus the formation of ODEs from families of curves.

Join JEE Gurukul Maths Course →

[cg_quiz title=”JEE Main Differential Equations 2027 — Quick Quiz” data=”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”]