For p greater than 0, the vector v2 = 2i + p + 1j is obtained by rotating the vector| JEE Mains 2021

For p greater than 0, the vector v2 = 2i + (p + 1)j is obtained by rotating the vector v1 = √3pi + j by an angle θ about the origin in a counterclockwise direction. If tanθ = (α√3 − 2) / (4√3 + 3), then the value of α is equal to

In this video, we explore a vector rotation problem involving two vectors and an angle of rotation around the origin. This JEE-level problem asks us to determine the value of α based on a given trigonometric ratio of tan(θ). We break down the step-by-step approach to solve for α and provide clear explanations of each step. Watch the full video to enhance your understanding of vector rotation, angles, and trigonometry, key concepts in competitive exams like JEE.