Hi my good friends!,
I am going through a paper with memo, and came upon a problem which I just cannot grasp. Please would someone explain this to me?
We have a parabola drawn above the x- axis with the axis of symetry to the right of the y-axis. The left side intersects Y at p.
The function is: f(x)=2x2−3x+p
The question is: Detrmine the value of p for which the graph will always be above the x- axis.
The answer is this, but I need someone to explain this to me please:
Δ=b2−4ac
=(−3)2−4(2)(p)
=9−8p
I understand the discriminant part....but why is this now put smaller than 0?
9−8p<0
P>98
How would I teach / explain this to a pupil?.Thank you all very much for taking the time to explain this to me...Thank you.
If the discriminant is < 0, then we will have non-real roots. In other words, the graph of f(x) will never intersect the x axis. [ It will always be above the x axis ]
This might help : https://www.desmos.com/calculator/nlbuvyisgg
When p = 8/8 (or, 1) the graph intersects the x axis twice
When p = 9/8 the graph is tangent to the x axis
When x = 10/8 the graph is above the x axis
I had a look at the link you provided, thank you kindly...I see it now...have a blessed day..