Let y=y(x) be the solution curve of the differentialJEE Main 2024 (Online) 8th April Evening Shift

Solve this Question:
Let y=y(x) be the solution curve of the differential equation sec⁡y dy/(" " dx)+2xsin⁡y=x^3 cos⁡y,y(1)=0. Then y(√3) is equal to:
A π/6
B π/12
C π/3 JEE Main 2024 (Online) 8th April Evening Shift

D π/4
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Introduction to differential equations Calculus Sections
calculus sections are a fundamental topic in the IIT JEE Mathematics syllabus. Understanding parabolas is crucial for solving complex mathematical problems efficiently. In this video, DK Sir breaks down the concepts in a clear and concise manner, ensuring that students grasp the fundamentals before moving on to more advanced problems.

Why differential equation calculus Sections are Important for IIT JEE
Parabolas, as part of conic sections, form a significant portion of the IIT JEE Mathematics curriculum. They are frequently tested in the exam, making it essential for students to have a strong command over this topic. Mastering parabola conic sections not only boosts your confidence but also enhances your overall performance in the Mathematics section of the IIT JEE exam.
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Step-by-step solutions to previous year IIT JEE questions on Continuity calculus sections.
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Keywords: IIT JEE Mathematics, differential equations, DK Sir, Previous Year Questions, IIT JEE Preparation, Form:
Form: (d^2 y)/(dx^2 )+p dy/dx+qy=g(x)
Homogeneous Equations:
Linear Homogeneous: (d^2 y)/(dx^2 )+p dy/dx+qy=0
Characteristic Equation: Solve r^2+pr+q=0 to find the general solution.
Non-Homogeneous Equations:
Particular Solution: Use methods such as undetermined coefficients or variation of parameters to find a particular solution when g(x)≠0.• Solve first-order and second-order differential equations.
• Apply various solution techniques to solve differential equations.
• Interpret the solution in the context of physical problems or geometrical contexts

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