Hyperbola
Last updated at December 16, 2024 by Teachoo
Transcript
Ex 10.4, 7 Find the equation of the hyperbola satisfying the given conditions: Vertices (±2, 0), foci (±3, 0) Given Vertices are (±2, 0) Hence, vertices are on the x-axis ā“ Equation of hyperbola is of the form šš/šš ā šš/šš = 1 Now, Co-ordinate of vertices = (±a, 0) & Vertices = (±2, 0) ā“ (±a, 0) = (±2, 0) Hence a = 2 Also, Given coordinates of foci = (±3, 0) And we know that co-ordinates of foci are (±c, 0) ā“ (±c, 0) = (±3, 0) c = 3 Also c2 = a2 + b2 Putting a = 2, c = 3 32 = 22 + b2 9 = 4 + b2 5 = b2 b2 = 5 Also, Given coordinates of foci = (±3, 0) And we know that co-ordinates of foci are (±c, 0) ā“ (±c, 0) = (±3, 0) c = 3 Also c2 = a2 + b2 Putting a = 2, c = 3 32 = 22 + b2 9 = 4 + b2 5 = b2 b2 = 5 Thus, Equation of hyperbola š„^2/š^2 ā š¦^2/š^2 = 1 š„^2/2^2 ā š¦^2/5 = 1 š^š/š ā š^š/š = 1