### Transcription of FIRST YEAR B.SC. MATHEMATICS PAPER I …

{{id}} {{{paragraph}}}

Example: marketing

**FIRST** YEAR **MATHEMATICS** **PAPER** I. SEMESTER I. DIFFERENTIAL EQUATIONS. **model** **question** **PAPER** (THEORY). Time: 3 Hours Max. Marks: 75. *This **PAPER** Consists of Two parts. Follow the Instructions Carefully PART A (5x5M =25M). Answer any FIVE Questions, each **question** carries FIVE marks . 1. Obtain the equation of the curve whose differential equation is (1 + x2) . +2xy 4x2 = 0 and passing through the origin.. 2. Solve the differential equation (1+ / ) dx + / ( 1 )dy = 0.. 3. Solve ( + ) = ( ). = x 2 +y 2. using the method of multipliers. 2 2. 4. Solve y logy = xpy +p . 5. Solve (D2-3D+2)y = Coshx.

FIRST YEAR B.SC. **MATHEMATICS PAPER** – I SEMESTER – I DIFFERENTIAL EQUATIONS **MODEL QUESTION PAPER** (THEORY) Time: 3 Hours Max. Marks: 75 *This **Paper** Consists of Two parts.

**Domain:**

**Source:**

**Link to this page:**

**Please notify us if you found a problem with this document:**

{{id}} {{{paragraph}}}