QUESTION IMAGE
Question
simplify.
$5\sqrt{147}$
$\sqrt{3}$
$\sqrt{49}$
$\sqrt{35}$
Step1: Factor 147 into prime factors
We know that \(147 = 49\times3\), and \(49 = 7^2\). So we can rewrite \(\sqrt{147}\) as \(\sqrt{49\times3}\).
\[
\sqrt{147}=\sqrt{49\times3}
\]
Step2: Use the property of square roots \(\sqrt{ab}=\sqrt{a}\times\sqrt{b}\) (where \(a = 49\), \(b = 3\))
According to the property \(\sqrt{ab}=\sqrt{a}\cdot\sqrt{b}\) (\(a\geq0,b\geq0\)), we have \(\sqrt{49\times3}=\sqrt{49}\times\sqrt{3}\). Since \(\sqrt{49} = 7\), then \(\sqrt{49\times3}=7\sqrt{3}\).
\[
\sqrt{147}=7\sqrt{3}
\]
Step3: Multiply by 5
Now we have the original expression \(5\sqrt{147}\), substitute \(\sqrt{147}=7\sqrt{3}\) into it, we get \(5\times7\sqrt{3}\).
\[
5\sqrt{147}=5\times7\sqrt{3}
\]
Step4: Calculate \(5\times7\)
Calculate \(5\times7 = 35\), so \(5\times7\sqrt{3}=35\sqrt{3}\).
\[
5\times7\sqrt{3}=35\sqrt{3}
\]
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
\(35\sqrt{3}\)