Solve (2sqrt(30))/(6)-(3sqrt(140))/(sqrt(28))+(sqrt(55))/(sqrt(99)) | Equatix - Math Solver

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Example

3(r+2s)=2t-4

a⋅(b-2)=3b

3(r+2s)=2t-4

a⋅(b-2)=3b

Question

$$\frac{ 2 \sqrt{ 30 } }{ 6 } - \frac{ 3 \sqrt{ 140 } }{ \sqrt{ 28 } } + \frac{ \sqrt{ 55 } }{ \sqrt{ 99 } }$$

Evaluate

$\frac{\sqrt{30}-8\sqrt{5}}{3}\approx -4.137106082$

Solution Steps

Divide $2\sqrt{30}$ by $6$ to get $\frac{1}{3}\sqrt{30}$.

$$\frac{1}{3}\sqrt{30}-\frac{3\sqrt{140}}{\sqrt{28}}+\frac{\sqrt{55}}{\sqrt{99}}$$

Factor $140=2^{2}\times 35$. Rewrite the square root of the product $\sqrt{2^{2}\times 35}$ as the product of square roots $\sqrt{2^{2}}\sqrt{35}$. Take the square root of $2^{2}$.

$$\frac{1}{3}\sqrt{30}-\frac{3\times 2\sqrt{35}}{\sqrt{28}}+\frac{\sqrt{55}}{\sqrt{99}}$$

Multiply $3$ and $2$ to get $6$.

$$\frac{1}{3}\sqrt{30}-\frac{6\sqrt{35}}{\sqrt{28}}+\frac{\sqrt{55}}{\sqrt{99}}$$

Factor $28=2^{2}\times 7$. Rewrite the square root of the product $\sqrt{2^{2}\times 7}$ as the product of square roots $\sqrt{2^{2}}\sqrt{7}$. Take the square root of $2^{2}$.

$$\frac{1}{3}\sqrt{30}-\frac{6\sqrt{35}}{2\sqrt{7}}+\frac{\sqrt{55}}{\sqrt{99}}$$

Cancel out $2$ in both numerator and denominator.

$$\frac{1}{3}\sqrt{30}-\frac{3\sqrt{35}}{\sqrt{7}}+\frac{\sqrt{55}}{\sqrt{99}}$$

Rationalize the denominator of $\frac{3\sqrt{35}}{\sqrt{7}}$ by multiplying numerator and denominator by $\sqrt{7}$.

$$\frac{1}{3}\sqrt{30}-\frac{3\sqrt{35}\sqrt{7}}{\left(\sqrt{7}\right)^{2}}+\frac{\sqrt{55}}{\sqrt{99}}$$

The square of $\sqrt{7}$ is $7$.

$$\frac{1}{3}\sqrt{30}-\frac{3\sqrt{35}\sqrt{7}}{7}+\frac{\sqrt{55}}{\sqrt{99}}$$

Factor $35=7\times 5$. Rewrite the square root of the product $\sqrt{7\times 5}$ as the product of square roots $\sqrt{7}\sqrt{5}$.

$$\frac{1}{3}\sqrt{30}-\frac{3\sqrt{7}\sqrt{5}\sqrt{7}}{7}+\frac{\sqrt{55}}{\sqrt{99}}$$

Multiply $\sqrt{7}$ and $\sqrt{7}$ to get $7$.

$$\frac{1}{3}\sqrt{30}-\frac{3\times 7\sqrt{5}}{7}+\frac{\sqrt{55}}{\sqrt{99}}$$

Cancel out $7$ and $7$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{\sqrt{55}}{\sqrt{99}}$$

Factor $99=3^{2}\times 11$. Rewrite the square root of the product $\sqrt{3^{2}\times 11}$ as the product of square roots $\sqrt{3^{2}}\sqrt{11}$. Take the square root of $3^{2}$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{\sqrt{55}}{3\sqrt{11}}$$

Rationalize the denominator of $\frac{\sqrt{55}}{3\sqrt{11}}$ by multiplying numerator and denominator by $\sqrt{11}$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{\sqrt{55}\sqrt{11}}{3\left(\sqrt{11}\right)^{2}}$$

The square of $\sqrt{11}$ is $11$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{\sqrt{55}\sqrt{11}}{3\times 11}$$

Factor $55=11\times 5$. Rewrite the square root of the product $\sqrt{11\times 5}$ as the product of square roots $\sqrt{11}\sqrt{5}$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{\sqrt{11}\sqrt{5}\sqrt{11}}{3\times 11}$$

Multiply $\sqrt{11}$ and $\sqrt{11}$ to get $11$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{11\sqrt{5}}{3\times 11}$$

Multiply $3$ and $11$ to get $33$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{11\sqrt{5}}{33}$$

Divide $11\sqrt{5}$ by $33$ to get $\frac{1}{3}\sqrt{5}$.

$$\frac{1}{3}\sqrt{30}-3\sqrt{5}+\frac{1}{3}\sqrt{5}$$

Combine $-3\sqrt{5}$ and $\frac{1}{3}\sqrt{5}$ to get $-\frac{8}{3}\sqrt{5}$.

$$\frac{1}{3}\sqrt{30}-\frac{8}{3}\sqrt{5}$$

Factor

$\frac{\sqrt{30} - 8 \sqrt{5}}{3} = -4.137106081648885$