Consider a circle whose size can vary. Let r represent the radius of the circle (in cm) and let C represent the circumference of the circle (in cm). Suppose the function f determines the circumference of the circle in cm, C , given its radius length in cm, r .'

a. Write a function formula for f.

b. What does f(12) represent in this context? Select all that apply.

i. The radius (in cm) of a circle whose circumference is 12 cm.
ii. A circle with a radius of 12 cm.
iii. The circumference (in cm) of a circle whose radius is 12 cm.
iv. A circle with a circumference of 12 cm.

c. If f(a) 12, what does a represent in this context? Select all that apply.
i. The circumference (in cm) of a circle whose radius is 12 cm.
ii. The radius (in cm) of a circle whose circumference is 12 cm.
iii. A circle with a circumference of 12 cm.
iv. A circle with a radius of 12 crm

d. What values can r assume in this context?
e. What values can f(r) assume in this context?

The question only asks for the expression for circumference in which the value of the radius can always be plugged in and a circumference obtained. And this, from basic geometry is 2πr.

b) Option (iii) is correct.

f(12) represents the circumference (in cm) of a circle whose radius is 12 cm.

A radius of r = 12 cm was plugged into the circumference equation and f(12) is the answer obtained.

c) Option (ii) is correct.

In the context f(a) = 12, a represents the radius (in cm) of a circle whose circumference is 12 cm

A radius of r = a cm was plugged into the circumference equation and 12 is the answer for circumference obtained.

d) In this context, the radius can take on values of every positive real number.

This is because simply, the radius of a circle is defined as a straight line from the center of a circle to the circumference of a circle.

Although, generally, a radius can take on virtually any real or imaginary number because more technically, a circle is the locus of all points equidistant from a central point. And this opens the scope of the radius. The general equation of a circle with centre (a,b) and radius, r is given as

(x - a)² + (y - b)² = r²

The square on the r, gives it the power to have such a wide range of values.

e) In this context, the circumference can take on values of every positive real number.

MrRoyal MrRoyal · Answer 2 · 2021-11-09T20:23:03+01:00

The circumference of a circle is a function of its radius.

(a) The function formula for f

The circumference of the circle is calculated as:

[tex]\mathbf{C = 2\pi r}[/tex]

Replace C with f(r)

So, we have:

[tex]\mathbf{f(r) = 2\pi r}[/tex]

Hence, the function formula for f is [tex]\mathbf{f(r) = 2\pi r}[/tex]

(b) What f(12) represents

In (a), we have:

[tex]\mathbf{f(r) = 2\pi r}[/tex]

This means that f is a function of r

So, f(12) represents the (iii) the circumference (in cm) of a circle whose radius is 12 cm.

(c) What a represents if f(a) = 12

In (a), we have:

[tex]\mathbf{f(r) = 2\pi r}[/tex]

This means that f is a function of r

So,

a represents (ii) the radius (in cm) of a circle whose circumference is 12 cm.

(d) The possible values of r

The radius of a circle is always positive.

So, the value of r can only assume a positive value

(e) The possible values of f(r)

The circumference of a circle is always positive.

So, the value of f(r) can only assume a positive value