25. evaluate ( 81^{\frac{1}{4}} ). (lesson 7 - 4)
26. simplify ( sqrt{98} ). (lesson 7 - 5)
27. simplify ( sqrt{121a^{5}b^{5}c} ). (lesson 7 - 5)
a. ( 11a^{2}bsqrt{abc} )
b. ( 11a^{2}b^{4} )
c. ( 11absqrt{ab^{3}c} )
d. ( 11bsqrt{a^{5}b^{5}c} )
28. simplify ( sqrt3{\frac{125a^{7}}{27b^{3}}} ). (lesson 7 - 5)
a. ( \frac{a^{2}}{b} )
b. ( \frac{5a^{6}}{3b^{3}} )
c. ( \frac{sqrt3{a^{7}}}{sqrt3{b}} )
d. ( \frac{5a^{2}}{3b} )
29. simplify ( 8sqrt{5}-6sqrt{5} ). (lesson 7 - 6)
30. simplify ( (8t^{6}u^{9})(3w^{7}) ). (lesson 7 - 4)
a. ( 11t^{6}u^{24} )
b. ( 24t^{6}u^{24} )
c. ( 24t^{6}u^{7} )
d. ( 24t^{6}u^{16} )
31. simplify ( (cd^{3})^{\frac{1}{3}} ). (lesson 7 - 4)
a. ( cd^{\frac{1}{3}} )
b. ( c^{\frac{1}{3}}d^{\frac{1}{3}} )
c. ( c^{\frac{1}{3}}d^{9} )
d. ( cd^{9} )
32. simplify ( 6sqrt3{4}cdot8sqrt3{28} ). (lesson 7 - 5)
a. ( 14sqrt3{32} )
b. ( 48sqrt3{112} )
c. ( 48sqrt3{14} )
d. ( 96sqrt3{14} )
33. simplify ( 4sqrt3{7}+9sqrt3{56} ). (lesson 7 - 6)
a. ( 4sqrt3{7}+9sqrt3{56} )
b. ( 13sqrt3{7} )
c. ( 22sqrt3{7} )
d. ( 36sqrt3{7} )

Question

Accepted Answer

# Explanation:
## 25. Step1: Rewrite as square root
$81^{\frac{1}{2}} = \sqrt{81}$
## 25. Step2: Evaluate the square root
$\sqrt{81} = 9$

## 26. Step1: Factor 98 into perfect square
$\sqrt{98} = \sqrt{49 	imes 2}$
## 26. Step2: Simplify the radical
$\sqrt{49 	imes 2} = \sqrt{49} 	imes \sqrt{2} = 7\sqrt{2}$

## 27. Step1: Split the radical into factors
$\sqrt{121a^5b^3c} = \sqrt{121} 	imes \sqrt{a^4 	imes a} 	imes \sqrt{b^2 	imes b} 	imes \sqrt{c}$
## 27. Step2: Simplify each radical term
$\sqrt{121} 	imes a^2\sqrt{a} 	imes b\sqrt{b} 	imes \sqrt{c} = 11a^2b\sqrt{abc}$

## 28. Step1: Split cube root into fractions
$\sqrt[3]{\frac{125a^6}{27b^3}} = \frac{\sqrt[3]{125a^6}}{\sqrt[3]{27b^3}}$
## 28. Step2: Simplify numerator and denominator
$\frac{\sqrt[3]{125} 	imes \sqrt[3]{a^6}}{\sqrt[3]{27} 	imes \sqrt[3]{b^3}} = \frac{5a^2}{3b}$

## 29. Step1: Combine like radical terms
$8\sqrt{5} - 6\sqrt{5} = (8-6)\sqrt{5}$
## 29. Step2: Calculate the coefficient
$(8-6)\sqrt{5} = 2\sqrt{5}$

## 30. Step1: Multiply coefficients and variables
$(8t^2u^5)(3tu^5) = (8 	imes 3) 	imes (t^2 	imes t) 	imes (u^5 	imes u^5)$
## 30. Step2: Simplify using exponent rules
$24 	imes t^{2+1} 	imes u^{5+5} = 24t^3u^{10}$

## 31. Step1: Apply power of a power rule
$(cd^{\frac{2}{3}})^3 = c^{1 	imes 3} 	imes d^{\frac{2}{3} 	imes 3}$
## 31. Step2: Simplify exponents
$c^3d^2$

## 32. Step1: Multiply coefficients and radicals
$6\sqrt[3]{4} \cdot 8\sqrt[3]{28} = (6 	imes 8) 	imes \sqrt[3]{4 	imes 28}$
## 32. Step2: Simplify the product inside radical
$48 	imes \sqrt[3]{112} = 48 	imes \sqrt[3]{8 	imes 14}$
## 32. Step3: Simplify the radical term
$48 	imes \sqrt[3]{8} 	imes \sqrt[3]{14} = 48 	imes 2 	imes \sqrt[3]{14} = 96\sqrt[3]{14}$

## 33. Step1: Rewrite $\sqrt[3]{56}$ as factored radical
$9\sqrt[3]{56} = 9\sqrt[3]{8 	imes 7} = 9 	imes 2\sqrt[3]{7} = 18\sqrt[3]{7}$
## 33. Step2: Combine like radical terms
$4\sqrt[3]{7} + 18\sqrt[3]{7} = (4+18)\sqrt[3]{7}$
## 33. Step3: Calculate the coefficient
$(4+18)\sqrt[3]{7} = 22\sqrt[3]{7}$

# Answer:
25. $9$
26. $7\sqrt{2}$
27. A. $11a^2b\sqrt{abc}$
28. D. $\frac{5a^2}{3b}$
29. $2\sqrt{5}$
30. D. $24t^3u^{10}$
31. B. $c^3d^2$
32. D. $96\sqrt[3]{14}$
33. C. $22\sqrt[3]{7}$

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QUESTION IMAGE

Question

Explanation:

25. Step1: Rewrite as square root

25. Step2: Evaluate the square root

26. Step1: Factor 98 into perfect square

26. Step2: Simplify the radical

27. Step1: Split the radical into factors

27. Step2: Simplify each radical term

28. Step1: Split cube root into fractions

28. Step2: Simplify numerator and denominator

29. Step1: Combine like radical terms

29. Step2: Calculate the coefficient

30. Step1: Multiply coefficients and variables

30. Step2: Simplify using exponent rules

31. Step1: Apply power of a power rule

31. Step2: Simplify exponents

32. Step1: Multiply coefficients and radicals

32. Step2: Simplify the product inside radical

32. Step3: Simplify the radical term

33. Step1: Rewrite $\sqrt[3]{56}$ as factored radical

33. Step2: Combine like radical terms

33. Step3: Calculate the coefficient

Answer: