Quadratic Equations : Solving, Graphing and Applications

1) Using the quadratic equation x2 - 3x + 2 = 0, perform the following tasks:
a) Solve by factoring.
Answer:
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b) Solve by completing the square.
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c) Solve by using the quadratic formula.
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2) For the function y = x2 - 6x + 8, perform the following tasks:
a) Put the function in the form y = a(x - h)2 + k.
Answer:
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b) What is the line of symmetry?
Answer:

c) Graph the function using the equation in part a. Explain why it is not necessary to plot points to graph when using y = a (x - h) 2 + k.
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Explanation of graphing.

d) In your own words, describe how this graph compares the graph of y = x2?
Answer:

3) Suppose you throw a baseball straight up at a velocity of 32 feet per second. A function can be created by expressing distance above the ground, s, as a function of time, t. This function is s = -16t2 + v0t + s0
? 16 represents ½g, the gravitational pull due to gravity (measured in feet per second 2).
? v0 is the initial velocity (how hard do you throw the object, measured in feet per second).
? s0 is the initial distance above ground (in feet). If you are standing on the ground, then s0 = 0.
a) What is the function that describes this problem?
Answer:

b) The ball will be how high above the ground after 1 second?
Answer:
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c) How long will it take to hit the ground?
Answer:
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d) What is the maximum height of the ball?
Answer:
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4) Amanda has 400 feet of lumber to frame a rectangular patio (the perimeter of a rectangle is 2 times length plus 2 times width). She wants to maximize the area of her patio (area of a rectangle is length times width). What should the dimensions of the patio be?

Answer:
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