EQUATIONS CONTAINING VARIABLES UNDER ONE OR MORE RADICALS
Note:
- In order to solve for x, you must isolate x.
- In order to isolate x, you must remove it from under the radical.
- If there is just one radical in the equation, isolate the radical.
- Then raise both sides of the equation to a power equal to the index
of the radical.
- With these types of equations, sometimes there are extraneous
solutions; therefore, you must check your answers.
- If the index of the radical is even, many times there will be a
restriction on the values of x.
Work the following problems. Click on Solution, if you want to
review the solutions.
Problem 2.7a:
![$\sqrt[7]{5x+3}+\displaystyle \frac{2}{3}=\displaystyle \frac{8}{3}$](img3.gif)
Solution
Problem 2.7b:
![$\sqrt[4]{10x-19}+3=6$](img4.gif)
Solution
Problem 2.7c:
![$\sqrt[3]{\displaystyle \frac{13x+5}{5}}+10=13$](img5.gif)
Solution
Problem 2.7d:
![$\sqrt[11]{\displaystyle \frac{3x+11}{2}}+5=4$](img6.gif)
Solution
If you would like to go back to the equation table of contents, click
on contents.
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[Differential Equations]
[Calculus]
[Complex Variables]
[Matrix Algebra]
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