Question

6) Convert the following parametric equation to rectangular equations. x = 2 tant-2 (x = 2 - 2 4 y = 2 + sect . (y = -2

Answer 1

@ Given, x = 2 tanta x+2 = 2 tant =) x+2 = tant sovuaring both sides, (+212 = (tant)? +4+2 (2)X = dan²t y (video on) x² +48+4 - tant - and also Given y = 2+ sect y-2 = sect saualling both .. sides, (y-2)2 = secat 92 +4-44= sec²d (1) Substract equation cu from equation Cii), we have, u & 4² +4-44 - (x² + 4x+4 ) = sec 2 &- lan ²t We know, (sec2 t - dan?t=1 4

ye+4-44 -3-48-4 - / fisechf-tun?t=1 4 =) - Hy? +16 - 167 -32-424-4 4y2-22 -164-47 +8=0 This is Rectangular Equation, © t - 2-26 =) -= - Squaring on both sides, 2? +4-4% = 4+2 — also given, - 4 = 44- & Put value of ut from equation lis, y y = (x²+4-48)- 5y = x?+ 4- 48 -10 x² - 4x - 5y-620 This is rectangular equation.