Find the equation defining graphs (a), (b) and (c).
You can express it in any of the 3 ways: general form, vertex form or factorised form (if possible).
Show all the working out.
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Note: exercise (d) is an extension. A bonus will be given if done correctly.
Hint: A system of 3 simultaneous equations must be solved with the GDC.
Respuestas a la pregunta
Respuesta:
Explicación paso a paso:
Question (a):
The graph of this function is a convex parabola, and it got one y-intercept in the point (0,4) and two x-intercept in the points (1,0) and (5,0). Then let put these points in the general formula:
Remember that the form of this function is: f(x)=ax²+bx+c, with a∈R, b∈R, c∈R, so let use the points in that formula:
f(x)=ax²+bx+c
*Point (0,4):
4=a(0)²+b(0)+c
c=4
*Point (1,0):
0=a(1)²+b(1)+c
0=a+b+c
*and point (5,0)
0=a(5)²+b(5)+c
0=25a+5b+c
Look that the first point (0,4) say that c=4, then let c=4 in the others two points:
0=a+b+4
0=25a+5b+4
You see a linear equations system with two variables and two equations. Let resolve by the substitution method.
a+b=-4
25a+5b=-4
b=-a-4
25a+5(-a-4)=-4
25a-5a-20=-4
20a-20=-4
20a=16
a=16/20=4/5
And if a=4/5, c=4, then b=-s-4=-4/5-4=-24/5
So the function is f(x)= (4/5)x²-(24/5)x+4
I hope you can do the others exercises. :)