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22 votes
22 votes
Question 1

Axis of symmetry for y=x²-12x +11
First, identify your coefficients (the numbers in front of the letters). a =
, and c=
Formula for AOS (Do not plug in numbers -- leave the letters): x =
Fill in the numbers: x =
X =
/(2*
1 pts
,b=

User Niema
by
3.1k points

1 Answer

23 votes
23 votes

Answer:

A quadratic equation is a polynomial equation of degree 2 . The standard form of a quadratic equation is

0=ax2+bx+c

where a,b and c are all real numbers and a≠0 .

If we replace 0 with y , then we get a quadratic function

y=ax2+bx+c

whose graph will be a parabola .

The axis of symmetry of this parabola will be the line x=−b2a . The axis of symmetry passes through the vertex, and therefore the x -coordinate of the vertex is −b2a . Substitute x=−b2a in the equation to find the y -coordinate of the vertex. Substitute few more x -values in the equation to get the corresponding y -values and plot the points. Join them and extend the parabola.

Example 1:

Graph the parabola y=x2−7x+2 .

Compare the equation with y=ax2+bx+c to find the values of a , b , and c .

Here, a=1,b=−7 and c=2 .

Use the values of the coefficients to write the equation of axis of symmetry .

The graph of a quadratic equation in the form y=ax2+bx+c has as its axis of symmetry the line x=−b2a . So, the equation of the axis of symmetry of the given parabola is x=−(−7)2(1) or x=72 .

Substitute x=72 in the equation to find the y -coordinate of the vertex.

y=(72)2−7(72)+2    =494−492+2    =49 − 98 + 84     =−414

User Ashok Shah
by
3.3k points