deci-

What is deci- in math? Definition.

In mathematics, the prefix "deci-" is used to denote a factor of one-tenth or 0.1. It is derived from the Latin word "decimus," meaning tenth. The prefix deci- is commonly used in the metric system to indicate a unit that is one-tenth of the base unit.

What knowledge points does deci- contain? And detailed explanation step by step.

The knowledge points related to deci- include:

1. Understanding the concept of fractions: Deci- represents a fraction with a denominator of 10, which means it is equivalent to dividing a whole into ten equal parts.

2. Conversion between deci- and other metric prefixes: It is important to understand the relationship between deci- and other metric prefixes, such as centi- (one-hundredth) and milli- (one-thousandth).

3. Decimal notation: Deci- can also be represented in decimal notation as 0.1.

What is the formula or equation for deci-? If it exists, please express it in a formula.

The formula for deci- is straightforward:

1 deci- = 0.1

This equation represents the conversion factor between the base unit and the deci- unit.

How to apply the deci- formula or equation? If it exists, please express it.

To apply the deci- formula or equation, simply multiply the value by 0.1 to convert it to the deci- unit. For example, if you have a length of 50 centimeters and want to convert it to decimeters, you would multiply it by 0.1:

50 cm * 0.1 = 5 decimeters

What is the symbol for deci-? If it exists, please express it.

The symbol for deci- is "d". It is commonly used in conjunction with the base unit symbol to represent the deci- unit. For example, the symbol for decimeter is "dm".

What are the methods for deci-?

There are several methods for working with deci-:

1. Conversion: Deci- can be converted to other metric prefixes by multiplying or dividing by the appropriate conversion factor. For example, to convert decimeters to centimeters, multiply by 10.

2. Addition and subtraction: When performing calculations involving deci-, it is important to ensure that all values are in the same unit. If not, convert them to the same unit before adding or subtracting.

3. Multiplication and division: When multiplying or dividing values with deci-, treat them as decimal numbers and perform the operation accordingly.

More than 2 solved examples on deci-.

Example 1: Convert 35 milliliters to deciliters.

Solution: Since milli- represents one-thousandth and deci- represents one-tenth, we need to convert milliliters to deciliters. Using the conversion factor of 1 deciliter = 100 milliliters, we can set up the equation:

35 milliliters * (1 deciliter / 100 milliliters) = 0.35 deciliters

Therefore, 35 milliliters is equal to 0.35 deciliters.

Example 2: A rectangular box has dimensions of 20 cm, 30 cm, and 40 cm. What is its volume in cubic decimeters?

Solution: To find the volume in cubic decimeters, we need to convert the dimensions to decimeters. Since 1 decimeter = 10 centimeters, we can use the conversion factor:

Volume = length * width * height

Volume = (20 cm * 10 decimeters/centimeter) * (30 cm * 10 decimeters/centimeter) * (40 cm * 10 decimeters/centimeter)

Volume = 20 decimeters * 30 decimeters * 40 decimeters = 24,000 cubic decimeters

Therefore, the volume of the rectangular box is 24,000 cubic decimeters.

Practice Problems on deci-.

1. Convert 75 grams to decigrams.
2. A car travels at a speed of 60 kilometers per hour. What is its speed in decimeters per second?

FAQ on deci-.

Question: What does deci- mean in the metric system? Answer: In the metric system, deci- represents a factor of one-tenth or 0.1. It is used to denote a unit that is one-tenth of the base unit. For example, a decimeter is one-tenth of a meter.