When 1,250 Superscript three-fourths is written in simplest radical form, which value remains under the radical?

2

5

6

8

[tex](54)^{\frac{2}{3}}=\sqrt[3]{(54)^{2}}[/tex] ,
Factorize 54 into prime factors ⇒ 54 = 2 × 3 × 3 × 3 = [tex]2(3)^{3}[/tex]
[tex]\sqrt[3]{(54)^{2}}=\sqrt[3]{[2(3^{3}]^{2}}=\sqrt[3]{2^{2}*3^{6}}[/tex]
2² can not go out the radical because 2 is less than 3 not divisible by 3
[tex]3^{6}[/tex] can go out the radical because 6 is divisible by 3, then divide 6 by 3, so it will be 3² out the radical
[tex]\sqrt[3]{(54)^{2}}=3^{2}\sqrt[3]{2^{2}}=9\sqrt[3]{4}[/tex]

Now let us solve your problem

∵ [tex]1250^{\frac{3}{4}}=\sqrt[4]{1250^{3}}[/tex]

- Factorize 1250 to its prime factors

∵ 1250 = 2 × 5 × 5 × 5 × 5

∴ [tex]1250=2*5^{4}[/tex]

∴ [tex]\sqrt[4]{(2*5^{4})^{3}}=\sqrt[4]{2^{3}*5^{12}}[/tex]

∵ 2³ can not go out the radical because 3 < 4 and not divisible by it

- [tex]5^{12}[/tex] can go out the radical because 12 can divided by 4

∵ 12 ÷ 4 = 3

∴ [tex]5^{12}[/tex] can go out the radical as 5³

∴ [tex]\sqrt[4]{1250}=5^{3}\sqrt[4]{2^{3}}[/tex]

∴ [tex]\sqrt[4]{1250}=125\sqrt[4]{8}[/tex]

∴ The value remains under the radical = 8

The value remains under the radical is 8

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erischaos578 erischaos578 · Answer 2 · 2021-01-14T21:41:12+01:00

Answer:

8

Explanation:

Egde 2020

Hope this helps :)

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When 1,250 Superscript three-fourths is written in simplest radical form, which value remains under the radical?2568