Lesson 14
Rewriting Quadratic Expressions
- Let’s practice rewriting quadratic expressions
14.1: Writing Quadratics in Standard Form
Use the given information to write a quadratic expression in standard form.
- \(a=k^2\)
- \(b=2k\boldcdot m\)
- \(c=m^2\)
- \(k = 1, m = 3\)
- \(k=2, m= 3\)
- \(k=2, m=4\)
- \(k = 3, m = 5\)
14.2: Practice Writing Expressions in Standard Form
In their math class, Priya and Tyler are asked to rewrite \((5x+2)(x-3)\) into standard form.
Priya likes to use diagrams to rewrite expressions like these, so her work looks like this.
| \(x\) | -3 | |
| \(5x\) | \(5x^2\) | \(\text-15x\) |
| 2 | \(2x\) | -6 |
\(5x^2 - 15x + 2x - 6\)
\(5x^2 -13x - 6\)
Tyler likes to use the distributive property to rewrite expressions like these, so his work looks like this.
\(5x(x-3) + 2(x-3)\)
\(5x^2 - 15x + 2x - 6\)
\(5x^2 - 13x - 6\)
Use either of these methods or another method you prefer to rewrite these expressions into standard form.
- \((2x+1)(2x-3)\)
- \((4x - 1)(\frac{1}{2}x - 3)\)
- \((3x-5)^2\)
- \((2x+1)^2\)
14.3: Find the Values
For each question, find the value of \(k\) and \(m\) then determine the value of \(m^2\).
-
- \(k > 0\)
- \(k^2 = 100\)
- \(2km = 40\)
-
- \(k < 0\)
- \(k^2 = 9\)
- \(2km = 30\)
-
- \(k < 0\)
- \(k^2 = 16\)
- \(2km = \text{-}40\)
-
- \(k > 0\)
- \(k^2 = 4\)
- \(2km = \text{-}28\)
-
- \(k > 0\)
- \(k^2 = 49\)
- \(2km = 14\)
-
- \(k > 0\)
- \(k^2 = 0.25\)
- \(2km = 12\)