Question

22r(x)=2√x s(x)=√x

(r/s)(3)=?

Answer 1

Explanation:

To find the value of (r/s)(3), you can use the values of r(x) and s(x) that you have provided and then calculate the expression:

1. r(x) = (√x) / 11

2. s(x) = √x

Now, you want to calculate (r/s)(3), which means you need to find r/s and then multiply it by 3:

r/s = [(√x) / 11] / √x

To simplify this, divide (√x) in the numerator and denominator:

r/s = [1 / 11]

Now, multiply (r/s) by 3:

(r/s)(3) = (1 / 11) * 3

(r/s)(3) = 3/11

So, (r/s)(3) equals 3/11.

Answer 2

`\sf (r)/(s)(3)=2`

Explanation:

Given:

`\sf r(x) =2√(x)`

`\sf s(x) = √(x)`

To find:

`\sf (r)/(s)(3)=?`

Solution:

To find
`\sf (r)/(s)(3)` , we need to evaluate the quotient of r(x) and s(x) when x = 3.

First, let's write down the expressions for r(x) and s(x):

`\sf r(x) =2√(x)`

`\sf s(x) = √(x)`

Now, calculate tex]\sf \dfrac{r}{s}(3)[/tex]:

`\sf (r)/(s)(3) = (r(3))/(s(3))`

Substitute the value of x as 3:

`\sf (r(3))/(s(3)) = \frac{2 \cancel{√(3)}}{\cancel{√(3)}} \\\\ = 2`

So,

`\sf (r)/(s)(3)=2`