SOLUTION: Prove if b is not = 0 then the graph of x2+bx+f=0 is a hyperbola if f is not= 0 and two intersecting lines if f=0

SOLUTION: Prove if b is not = 0 then the graph of x2+bx+f=0 is a hyperbola if f is not= 0 and two intersecting lines if f=0

Algebra.Com

Question 1052541: Prove if b is not = 0 then the graph of x2+bx+f=0 is a hyperbola if f is not= 0 and two intersecting lines if f=0
Answer by ikleyn(52803) (Show Source): You can put this solution on YOUR website!
.
1. The statement is wrong.

2. The post is nonsense.

RELATED QUESTIONS
the lines f(x)= ax+b and g(x)=bx-a are perpendicular lines a.) f(0)*g(0) b.) if... (answered by stanbon)

How to show that if X1 and X2 are the two roots of {{{ ax^2+bx+c=0 }}} , then {{{... (answered by josmiceli,Boreal)

Suppose f is the function whose domain is the interval [−2, 2], with f defined by... (answered by richard1234)

Give vertex and axis of symmetry for f(x) = x ^2 + 2 (f(x)= x squared plus two Not... (answered by oscargut)

The graph of the relation x^2 - 4y^2 + 2x - 8y - 10 = 0 is a (an) a. point b.... (answered by algebrapro18)

Determine the values of a and b such that the following function is differentiable at 0 (answered by solver91311)

Can you please help me with this question: If B Is not equal to 0, classify the graph of... (answered by rothauserc)

Hi,my name is Natalia. I solved two problems, but I'm not sure that I did it right. I... (answered by venugopalramana)

If the difference of the roots of the equation 2x2 − (a +1)x+a−1 = 0 is equal (answered by ikleyn)