# DOES tripling the radius of a cylinder triple the volume?

### Table of Contents

- DOES tripling the radius of a cylinder triple the volume?
- What effect does tripling the radius of a cylinder have on its volume?
- What happens when you triple the height of a cylinder?
- HOW DOES tripling the radius of a cylinder affect the surface area?
- What is the volume of the right cylinder?
- What is the relationship between volume and radius of a cylinder?
- What is the relationship between volume and radius?
- What happens to the volume when you double the height of a cylinder?
- What is the volume of this cylinder?
- What happens when the height of a cylinder is tripled?
- How does the volume of a cylinder change?
- How to calculate triple integral in cylindrical coordinates?
- What is the height of a cylinder calculator?

### DOES tripling the radius of a cylinder triple the volume?

**Volume** of **cylinder is** proportional to the square of **radius** of the **cylinder**. If **radius is tripled** then **volume** becomes 9 times.

### What effect does tripling the radius of a cylinder have on its volume?

Answer: It **will become nine times of the original volume**.

### What happens when you triple the height of a cylinder?

1 Expert Answer **The volume has doubled**.

### HOW DOES tripling the radius of a cylinder affect the surface area?

Answer: So tripling the **radius triples the lateral surface area involves the square of the radius**. (b) tripling the radius multiplies the lateral surface area by 3, because the formula for the lateral surface area, , only involves the radius to the first power.

### What is the volume of the right cylinder?

Explanation: The formula for the volume of a right cylinder is: **V = A * h**, where A is the area of the base, or πr2. Therefore, the total formula for the volume of the cylinder is: V = πr2h. First, we must solve for r by using the formula for a circumference (c = 2πr): 25π = 2πr; r = 12.5.

### What is the relationship between volume and radius of a cylinder?

The formula for the volume of a cylinder is V=Bh or **V=πr2h** . The radius of the cylinder is 8 cm and the height is 15 cm. Substitute 8 for r and 15 for h in the formula V=πr2h .

### What is the relationship between volume and radius?

The volume V of a sphere is **four-thirds times pi times the radius cubed**. The volume of a hemisphere is one-half the volume of the related sphere. Note : The volume of a sphere is 2/3 of the volume of a cylinder with same radius, and height equal to the diameter.

### What happens to the volume when you double the height of a cylinder?

Doubling the height of a cylinder **doubles the volume**, while doubling the radius generates a volume 4 times greater.

### What is the volume of this cylinder?

The formula for the volume of a cylinder is **V=Bh** or V=πr2h . The radius of the cylinder is 8 cm and the height is 15 cm. Substitute 8 for r and 15 for h in the formula V=πr2h .

### What happens when the height of a cylinder is tripled?

The radius and the height of the cylinder are two separate measurements. When calculating volume, one of them is a square and the other is linear so the answer here could be the volume changes by a factor of 3 (the height is tripled) a factor of 9 (the radius is tripled) or a factor of 27 (3*9 when both are tripled).

### How does the volume of a cylinder change?

If the length of a cylinder were to double, then the volume of the cylinder will double. Volume for a cylinder is defined by length times diameter. How does the volume of a cylinder change if the radius is tripled?

### How to calculate triple integral in cylindrical coordinates?

Let be the region bounded below by the cone and above by the paraboloid ( (Figure) ). Set up a triple integral in cylindrical coordinates to find the volume of the region, using the following orders of integration:

### What is the height of a cylinder calculator?

Height of a Cylinder Calculator Cylinder is one of the basic geometric shapes formed by the points at a fixed distance from a given line segment. It is also referred as the axis of the cylinder. The height (h) refers to the perpendicular distance between the two bases.