To find the volume of the cone in the picture where S = 13 cm and R = 5 cm:
Step 1:
Step 2:
Step 3:
Word Bank:
Find h by using the Pythagorean Theorem: r^2 + h^2 = s^2The volume is approximately 314.16 cm^3Since h = 6, use the V = (1/3)(pi)(r^2)(h) to find the volumeFind h by using the area of a triangle = (b x h)/2Since h = 12, use the V = (1/3)(pi)(r^2)(h) to find the volumeThe volume is approximately 38.04 cm^3
AAAaannndd the bot gets it wrong yet again!
clearly, h=12
So the rest of the solution is garbage.
criticize yourself as the old saying people who live in a glass house cant throw rocks meaning you cant talk about others weaknesses when you have similar weaknesses yourselves.
To find the volume of the cone in the picture where S = 13 cm and R = 5 cm, you can follow these steps:
Step 1: Find the height (h) of the cone using the Pythagorean Theorem: r^2 + h^2 = s^2
In this case, r = 5 cm and s = 13 cm. Substitute these values into the equation: 5^2 + h^2 = 13^2
Simplify this equation: 25 + h^2 = 169
Subtract 25 from both sides: h^2 = 144
Find the square root of both sides: h = 12 cm
Step 2: Use the volume formula for a cone: V = (1/3)(pi)(r^2)(h)
Substitute the given values into the formula: V = (1/3)(pi)(5^2)(12)
Simplify: V = (1/3)(pi)(25)(12)
Multiply: V = (1/3)(pi)(300)
Simplify: V = 100(pi)
Since pi is an irrational number commonly approximated as 3.14, the volume is approximately 314.16 cm^3.
Therefore, the correct answer is: The volume is approximately 314.16 cm^3
Step 1: Find h by using the Pythagorean Theorem: r^2 + h^2 = s^2
Step 2: Since h = 6, use the V = (1/3)(pi)(r^2)(h) to find the volume
Step 3: The volume is approximately 314.16 cm^3