Answer:
y = ( x - 5 )²-10
vertex: (5, -10)
y - intercept: ( 0,15)
Step-by-step explanation:
In order to solve this you first have to create a perfect square trinomial, with the first and second term of the function, which would be X^2 and -10, -10 divided by two would be -5 and -5 squared would be 25, so the equation would be more or less like this:
[tex]y = x^2 – 10x + 15\y = (x^2 – 10x + 15 +10)-10 \\y=(y-5)^2-10\\[/tex]
That would be vertex form, and the vertex is calculated by taking the root of the perfect squared trinomial and equalizing it to zero:
x-5=0
x=5 and y= -10 that would be vertex.
And the intersect with the Y-axis is calculated evaluating the equation when x equals 0, that would be:
[tex]y =x^2-10x + 15\\y= 0^2-10(0)+15\\y=15[/tex]
