af Khaliq Eshal 3 år siden
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The highest or lowest point on a parabola. If the parabola goes downwards it's maximum, and if it's going upwards it's minimum.
The point where the axis of symmetry and the parabola meet at it's maximum or minimum value.
Is a vertical line that divides the parabola into two equal parts. The axis of symmetry is the sum of the roots divided by two.
Also called roots. They are the x-intercepts of a parabola, and can have one, two, or zero roots.
The co-ordinate where the parabola crosses the y-axis.
(b^2-4ac)
Discriminant
ax^2 + bx + c = a(x-h)^2 + k
y=3x^2-12x-5 y=(3x^2-12x)-5 y=3(x^2-4x)-5 -4/2=-2^2=4 y=3(x^2-4x+4)-5 y=3(x^2-4x+4)-17 y=3(x-2)^2-17
Put brackets around ax^2+bx terms Common Factor the "a" value Make Perfect Square Trinomial inside bracket using: (b/2)^2 Add the opposite sign of the (b/2)^2 inside the bracket EX. 2(x^2+6x+9-9)+11 Move the opposite sign (b/2)^2 value outside bracket by multiplying it by "a" value Add this value with the k value outside bracket to get final k value Keep the "a" value outside bracket and square root the first term x^2, keep the sign of the middle term (addition or subtraction) and square root the last term in bracket, add a square outside of end bracket to give you: (x-h)^2 Write out the final Equation that is left over Vertex = (2,17) Minimum = -17
2(x + 4) = 2(x + 4) =2x+8 Example 2
Factor out the GCF by dividing it with all the terms Move GCF outside of bracket Multiply a value and c value Find two numbers that multiply to the product of a(c) and have the sum of b Substitute the two numbers for the middle term Group the terms with common factors and factor each binomial group The last two binomials should be the same so you simplify them together by writing the product as the square of the binomial
(2x – 3)(2x – 3) = (2x – 3)^2
a^2±2ab+b^2 = (a±b)^2 We have to find out what a and b are
2ab = 2(2x)(3) = 4x(3) = 12x
Therefore, 2ab is the middle term which means it is a square trinomial
a^2 = 4x^2 so a=√4x^2 = 2x b^2 = 9 so b=√9 = 3
Example 1
Example 2
Vertex (h,k) k = y value of the vertex "k" represents a vertical shift h = x value of the vertex and axis of symmetry
"h" represents a horizontal shift
"k" represents a vertical shift
If a > 1 or a < -1, then the graph is stretched vertically by a factor of a a = vertical stretch/compression factor
a = vertical stretch/compression factor
Use Step Pattern for plotting points of parabola
Step Pattern -------------- a=2 2, 6, 10, 14,....
Step Pattern -------------- a=1 1,3,5,7,9,....
a value cannot be 0 x is the unknown variable a, b and c are all known values c value is the y-intercept of parabola a = vertical stretch factor
If discriminant is zero there is 1 root
Positive discriminant = 2 roots
Negative discriminant = no real roots