Which statement is true concerning the vertex and the axis of symmetry of g(x)=5x2-10x?
3 answers:
Answer:
x =1 & vertex is (1,-5)
Step-by-step explanation:
differentiate the equation with respect to 'x' and equate it to zero
we get
10(x-1)=0
x= 1
substitute in main equation
we get g(x) = -5
so the point is (1,-5)
*(this is the simplest way to find vertex of a parabola)
don't know differentiation?
then you have to convert the equation into standard form
(x-h)²= 4a(y-k)
(h,k) is vertex
Answer:
The vertex is at (1,-5) and the axis of symmetry is y=1
Step-by-step explanation:
The function written in vertex form is g(x)=5(x−1)2−5. The vertex is at (1, –5) and the axis of symmetry is x=1.
The function written in vertex form is g(x)=5(x−1)2−5. The vertex is at (1, –5) and the axis of symmetry is x=1.
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