Completing the Square and Solving Quadratic Equations
Type your answers in the blanks and click Submit.
Question 1
Fill in the blanks to transform the quadratic equation
y=4x2−20x+24y equals 4 x squared minus 20 x plus 24
into vertex form by completing the square. Use decimals or fractions as needed.
Answer:Correct! Go to question 2.Incorrect. The answer is:
y=4x2−20x+24y equals 4 x squared minus 20 x plus 24
Group the x terms: y=(4x2−20x)+24y equals parenthesis 4 x squared minus 20 x parenthesis plus 24
Factor out the coefficient on x2: y=4(1x2−5x)+24y equals 4 times the quantity 1 x squared minus 5 x plus 24
Complete the square: y=4(1x2−5x+6.25)+24−25y equals 4 times the quantity 1 x squared minus 5 x plus 6 and 25 hundredths plus 24 minus 25
[using fraction:
y=4(1x2−5x+25 4 )+24−25]y equals 4 times the quantity 1 x squared minus 5 x plus twenty-five fourths plus 24 minus 25
Factor: y=4(1x−2.5)2−1y equals 4 times the quantity 1 x minus 2 and 5 tenths squared minus 1
[using fraction:
y=4(1x−52)2−1]y equals 4 times the quantity 1 x minus five halves squared minus 1
Go to question 2.
Incorrect. Try again.
•Remember to take half of the coefficient of x and then square it.
•Be sure to keep the equality by taking the product of the coefficient of x2 that was factored out times the value added in the parentheses, and then subtracting this product.