Which is equivalent to 16 superscript three-fourths x? rootindex 4 startroot 16 endroot superscript 3 x rootindex 4 x startroot 16 endroot cubed rootindex 3 startroot 16 endroot superscript 4 x rootindex 3 x startroot 16 endroot superscript 4
Which Is Equivalent To 16 Superscript Three-Fourths X? Rootindex 4 Startroot 16 Endroot Superscript 3 X Rootindex 4 X Startroot 16 Endroot Cubed Rootindex 3 Startroot 16 Endroot Superscript 4 X Rootindex 3 X Startroot 16 Endroot Superscript 4
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Which Is Equivalent To 16 Superscript Three-Fourths X? Rootindex 4 Startroot 16 Endroot Superscript 3 X Rootindex 4 X Startroot 16 Endroot Cubed Rootindex 3 Startroot 16 Endroot Superscript 4 X Rootindex 3 X Startroot 16 Endroot Superscript 4. Rewrite 16 as a power of 2. In this case, we can express \(16^{\frac{3}{4}}\) as \((\sqrt[4]{16})^3\).
Solved Which is equivalent to 16 Superscript threefourths x from www.gauthmath.com
According to the laws of exponents, this can be expressed as the fourth root of 16 raised to the third power. So, the expression is equivalent to 2. Let’s analyze the problem step by step to find which is equivalent to ( 16^ {\frac {3} {4}} ).
Here’s How We Can Break It.
Post any question and get expert help quickly. Rewrite 16 as a power of 2. The expression 3 841 ⋅ x simplifies to 241 ⋅ x.
Since \(16\) Is A Perfect Fourth Power, We Can Simplify \(\Sqrt[4]{16}\) To \(2\), And Then Raise It To The Power Of \(3\).
So, the expression is equivalent to 2. Since 16 is equal to $$2^ {4}$$24, we can. To achieve this, we calculated the cube root of 8 to be 2 and then raised it to the power of.
Which Expression Is Equivalent To Rootindex 3 Startroot X Superscript 5 Baseline Y Endroot?
According to the laws of exponents, this can be expressed as the fourth root of 16 raised to the third power. Not the question you’re looking for? Let’s analyze the problem step by step to find which is equivalent to ( 16^ {\frac {3} {4}} ).
The Expression ( 16^ {\Frac {3} {4}} ) Is A Power Of A Power.
There are 2 steps to solve this one. We want to find an expression that is equivalent to. In this case, we can express \(16^{\frac{3}{4}}\) as \((\sqrt[4]{16})^3\).
