<u>Given</u>:
Given that the radius of the cone is 10 cm.
The height of the cone is 25 cm.
We need to determine the volume of the cone.
<u>Volume of the cone:</u>
The volume of the cone can be determined using the formula,
where r is the radius and h is the height of the cone.
Substituting r = 10 and h = 25, we get;
Simplifying, we have;
Multiplying, we get;
Dividing, we get;
Thus, the volume of the cone is 2616.67 cubic cm.
Hence, Option c is the correct answer.
Answer:
15
Step-by-step explanation:
that is the answer
The volume of a cone is calculated through the equation,
V = (πD²/4)(H)/3
where V is volume,
D is diameter
H is height
Substituting the known values,
V = (π(3m)²/4)(4m)/3
Simplifying,
V = 3π m³
The volume of the cone is equal to 3π or 9.42 m³. The value should complete the volume statement of the cone.
The value of c that makes the given trinomial a perfect square is 9.
The given expression is:
<h3>What is a perfect square trinomial? </h3>
A polynomial is called a perfect square trinomial if it can be written in terms of the square of another polynomial.
Let us write the given expression in (a+b)² form
.....(1)
We know ......(2)
To make (1) like we need to put c=9
Hence, the value of c that makes the given trinomial a perfect square is 9.
To get more about polynomials visit:
brainly.com/question/2833285
Answer:
32456 dividido por 73 es
Step-by-step explanation:
444.602