Question

Which shows the expressions in the order they would appear on a number line from least to greatest?

Answer 1

Answer:

option c

Step-by-step explanation:

11/9<√5<√11<√20<2³

Answer 2

The correct option is C) $\frac{11}{9}, \sqrt{5}, \sqrt{11}, \sqrt{20}, 2^3$.

Step-by-step explanation:

Consider the provided numbers.

The value of $2^3=8$

The value of $\sqrt{5}\approx2.236$

The value of $\sqrt{20}\approx4.472$

The value of $\sqrt{11}\approx3.317$

The value of $\frac{11}{9}\approx1.22$

The least number is $\frac{11}{9}$ and greatest number is $2^3$.

Therefore, 1.22<2.236<3.317<4.472<8

The order of the expression from least to greatest is:

$\frac{11}{9}, \sqrt{5}, \sqrt{11}, \sqrt{20}, 2^3$

Hence, the correct option is C) $\frac{11}{9}, \sqrt{5}, \sqrt{11}, \sqrt{20}, 2^3$.

#Learn more

https://brainly.com/question/1890541

Which shows the expressions in the order they would appear on a number line from least to greatest?

a.17 over 9, square root of 6, square root of 15, square root of 30, 3 to the power of 3

b.3 to the power of 3, square root of 30, square root of 15, square root of 6, 17 over 9

c.3 to the power of 3, square root of 6, square root of 15, 17 over 9, square root of 30

d.17 over 9, square root of 30, square root of 15, 3 to the power of 3, square root of 6