Theme: Radicals...
  • A patio is shaped like a golden rectangle. it’s length ( the longer side) is 16ft. what is the patios width? write your answer in simplified radical form.
  • Find the zeros in simplest radical form: y=1/2x^2-4
  • What is 6=radical v-2
  • Express the product of cos 30°and 45° in simple simplest radical form
  • Can anyone solve this radical equation?
  • How to solve this equation involving radicals. 8x(x – 6)1/2 + 4(x – 6)3/2 = 0
  • Suppose functions are defined as follows. u(x)=x^2+7w(x)=radical x+4Find: (w o u)(5) (u o w)(5)
  • Find in simplest radical form, the length of the line segment with endpoints whose coordinates are (-1,4) and (3,2)?
  • What is 2√​9x − 6 = 10 − 2√​x
  • WHAT IS X^2+3X-10=0 IN SIMPLEST RADICAL FORM
  • a right triangle. If AC = 7 and BC = 8, find AB. Leave your answer in simplest radical form.
  • (Sqrt2x+10)-6=2 show work
  • Fourth root of 128x^7 y^7
  • Katherine wants to construct a small box with a volume of 20 cubic inches with the following specifications. The length of a box is five more than its width. Its depth is one less than its width. What are the dimensions of the box in simplest radical form and rounded to the nearest hundredth? Only and algebraic solution will receive full credit.
  • simplify these radicals without decimals
  • \(14=\frac{7x}{3} + 2\)
  • Turn 4√5 into an entire radical (unsimplify), the process
  • ! I’ll be your fan Part 1. Create two radical equations, one that has an extraneous solution, and one that does not have an extraneous solution. Use the equation below as a model. a√x+b+c=d Use a constant in place of each variable a, b, c, and d. You can use positive and negative constants in your equation. Part 2. Show your work in solving the equation. Include the work to check your solution and show that your solution is extraneous. Part 3. Explain why the first equation has an extraneous solution and the second does not.
  • with number 16 .