Textbook Question
Solve each equation. √(6x+7) - 9 = x-7
297
views
1. Equations & Inequalities
Choosing a Method to Solve Quadratics
8:27 minutesProblem 58
Textbook Question
Solve each equation. √(4x+1)-√(x-1)=2
Verified step by step guidance1
Identify the equation given: \(\sqrt{4x+1} - \sqrt{x-1} = 2\). Our goal is to solve for \(x\).
Isolate one of the square root terms to one side of the equation. For example, add \(\sqrt{x-1}\) to both sides to get \(\sqrt{4x+1} = 2 + \sqrt{x-1}\).
Square both sides of the equation to eliminate the square root on the left. This gives: \(\left(\sqrt{4x+1}\right)^2 = \left(2 + \sqrt{x-1}\right)^2\).
Simplify both sides: the left side becomes \$4x + 1\(, and the right side expands using the formula \)(a+b)^2 = a^2 + 2ab + b^2$ to \(4 + 4\sqrt{x-1} + (x - 1)\).
Rearrange the equation to isolate the remaining square root term, then square both sides again to eliminate it. After that, solve the resulting polynomial equation for \(x\), and check all solutions in the original equation to avoid extraneous roots.
Verified video answer for a similar problem:This video solution was recommended by our tutors as helpful for the problem above
Video duration:
8mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Square Root Functions and Radicals
Square root functions involve expressions under a radical sign (√). Understanding how to manipulate and simplify radicals is essential, especially when isolating terms or combining like radicals in an equation.
Recommended video:
02:20
Imaginary Roots with the Square Root Property
Isolating and Squaring Both Sides
To solve equations with square roots, isolate one radical on one side and then square both sides to eliminate the square root. This process may need to be repeated if multiple radicals remain, but it can introduce extraneous solutions.
Recommended video:
03:42Linear Inequalities with Fractions & Variables on Both Sides
Checking for Extraneous Solutions
After solving, substitute solutions back into the original equation to verify their validity. Squaring both sides can create extraneous solutions that do not satisfy the original equation, so this step ensures only true solutions are accepted.
Recommended video:
05:21Restrictions on Rational Equations
Related Videos
Related Practice