Math
 👍 0
 👎 0
 👁 159

 👍 0
 👎 0
Respond to this Question
Similar Questions

Math check please
1. Solve the system of equations y=2x^23 y=3x1 a)no solution b)(1/2,5),(2,5/2) c)(1/2,5/2),(2,5)**** d)(1/2,5/2),(2,5) 2. How many real number solutions are there to the equation 0=3x^2+x4? a)0 ***** b)1 c)2 d)3 3.solve
asked by Kendra on March 19, 2015 
Math
Lesson 8: Systems of Linear and Quadratic Equations Check my work 1. Solve the system of equations. y = 2x^2  3 y = 3x  1 a. no solution b. (1/2, 5), (2, 5/2) c. (1/2, 5/2), (2,5)*** d. (1/2, 5/2), (2, 5) 2.how many real
asked by Gameknight on March 19, 2020 
Algebra
1.Solve the system of equations. y = 2x^2  3 y = 3x  1 a. no solution b. (1/2, 5), (2, 5/2) c. (1/2, 5/2), (2,5) d. (1/2, 5/2), (2, 5) 2.how many real number solutions does the equation have 0 = 3x^2 + x  4 a. 0 b. 1 c. 2
asked by Gameknight on March 19, 2020 
help
Introduction to quadratic equations? If you solve the equation by completing the square, fill in the blanks. 9x^2+9x+4=0 x^2+x+blank=4/9+blank
asked by Chelsea:) on April 20, 2012 
math
2x^2 + 5x  8 = 0 Solve the quadratic equation by completing the square.
asked by Jack on September 20, 2012

Algebra
What method(s) would you choose to solve the equation? Explain your reasoning. 4x^248=0 a. Quadratic formula, graphing; the equation cannot be factored easily since the numbers are large. Selected:b. Square roots; there is no
asked by Lindsey on April 2, 2020 
Algebra
Completing the square method allows you to solve any quadratic equation. For each of the following determine what number completes the square. I cannot find my notes on completing the square, can someone please help with these two
asked by Christian on May 21, 2007 
Algebra Quadratic Equations
I am trying to define the different appraoches to solving quadratic equations. My book says using quadratic formula, completing the sqaure and factoring. I thought completing the square would be by facotring? How are these two
asked by Marysvoice on February 5, 2008 
Algebra2
Find the polynomials roots to each of the following problems: #1) x^2+3x+1 #2) x^2+4x+3=0 #3) 2x^2+4x5 #3 is not an equation. Dod you omit "= 0" at the end? #2 can be factored into (x+1)(x+3) = 0, so the roots are x=1 and 3.
asked by Haylee on May 13, 2007 
Math
Methods: Factoring, completing the square, quadratic formula. for these equations: 1. x^2  x = 6 2. 2x^2 + 5x  3 = 0 3. 3x^2 + x + 1 = 0 4. 2x(x  5) = 12 is there any reason to chose one method over the other to solve the
asked by anonymous on September 2, 2018
You can view more similar questions or ask a new question.