How do you find the equation of the hyperbola with center at the origin and vertices #(+-3,0)# and foci #(+-5,0)#? Precalculus Geometry of a Hyperbola General Form of the Equation 1 Answer bp Feb 16, 2017 #x^2 /3^2 - y^2/4^2 =1# Explanation: Answer link Related questions What type of conic section has the equation #4x^2 - 25y^2 - 50y - 125= 0#? What type of conic section has the equation #4x^2 - y^2 +4y - 20= 0#? What type of conic section has the equation #9y^2 - x^2 - 4x+54y +68= 0#? What type of conic section has the equation #4x^2 - y^2 - 16x - 2y+11=0= 0#? How do I convert the equation #4x^2 - y^2 - 24x+4y +28= 0# to standard form? How do I use completing the square to convert the general equation of a hyperbola to standard form? How do I convert the equation #-9x^2 +4y^2 +72x-16y =164# to standard form? What type of conic section has the equation #4x^2-y^2=16#? What type of conic section has the equation #9x^2-4y^2=36#? How do I convert the equation #9x^2−y^2+54x+10y+55=0# to standard form? See all questions in General Form of the Equation Impact of this question 7071 views around the world You can reuse this answer Creative Commons License