The lateral surface area S of a right circular cone is given by (equation given below). What radius should be used to produce a cone of height 5 inches and lateral surface area 100 square inches?
a. r = 1.52138.
b. r = 4.658
c. r = 78
d. r = 6.7432

Given:
Lateral Area = π * r * (√h² + r²)

Lateral Area = 100 in² ; height = 5 in

I find it hard to derive the formula of r because of the radical sign. So, I'll just plug each radius to the formula to check confirm the given lateral area.

a) r = 1.52138 ⇒ LA = 24.98
b) r = 4.658 ⇒ LA = 100
c) r = 78 ⇒ LA = 19152.68
d) r = 6.7432 ⇒ LA = 177.84

The radius is B.) r = 4.658 inches

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wifilethbridge wifilethbridge · Answer 2 · 2019-05-16T11:32:46+02:00

Answer:

r = 4.658

Step-by-step explanation:

Height of cone = 5 inches

Curved surface area of cone =[tex]\pi r \times \sqrt{r^2+h^2}[/tex]

We are given that lateral surface area is 100 square inches.

So, [tex]100 = 3.14 \times r \times \sqrt{r^2+5^2}[/tex]

[tex]100 = 3.14 \times r \times \sqrt{r^2+25}[/tex]

[tex]\frac{100}{3.14}= r \times \sqrt{r^2+25}[/tex]

[tex]31.847= r \times \sqrt{r^2+25}[/tex]

Squaring both sides

[tex]1014.231409= r^2 \times (r^2 +25)[/tex]

[tex]1014.231409= r^4 +25r^2)[/tex]

[tex] r^4 +25r^2-1014.231409=0[/tex]

Solving this using Scientific calculator

r = 4.658

Hence the radius should be used to produce a cone of height 5 inches and lateral surface area 100 square inches is 4.658 inches

The lateral surface area S of a right circular cone is given by (equation given below). What radius should be used to produce a cone of height 5 inches and lateral surface area 100 square inches? a. r = 1.52138. b. r = 4.658 c. r = 78 d. r = 6.7432

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The lateral surface area S of a right circular cone is given by (equation given below). What radius should be used to produce a cone of height 5 inches and lateral surface area 100 square inches?
a. r = 1.52138.
b. r = 4.658
c. r = 78
d. r = 6.7432