## What is it called when you compare unlike quantities?

If the two quantities you are comparing have different units of measure, this kind of ratio is called a rate. A rate is in the form of a unit rate when the denominator is 1. Writing a Rate. A rate is a ratio of two measurements that have different units.

## How do you compare two quantities?

To compare two quantities, their units must be the same. Two ratios can be compared by converting them into like fractions. If the two fractions are equal, we say that the two given ratios are equivalent. If two ratios are equivalent (or equal), then the involved four quantities are said to be in proportion.

**What compare two of the same or different quantities?**

A rate is a ratio that compares two different quantities that have different units of measure. A rate is a comparison that provides information such as dollars per hour, feet per second, miles per hour, and dollars per quart, for example. The word “per” usually indicates you are dealing with a rate.

### What is the relationship between two or more quantities called?

A ratio is a comparison of two quantities. A proportion is an equality of two ratios. To write a ratio: Determine whether the ratio is part to part or part to whole.

### What does it mean to compare two amounts?

In math, to compare means to examine the differences between numbers, quantities or values to decide if it is greater than, smaller than or equal to another quantity.

**When two quantities are related the quantities are said to be?**

In mathematics, two varying quantities are said to be in a relation of proportionality, multiplicatively connected to a constant; that is, when either their ratio or their product yields a constant.

## What is a proportional relationship between two quantities?

If the relationship between two quantities is a proportional relationship, this relationship can be represented by the graph of a straight line through the origin with a slope equal to the unit rate. For each point (x, y) on the graph, ž is equal to k, where k is the unit rate. The point (1, k) is a point on the graph.

## What is used to compare two or more quantities of the same kind?

A ratio is a comparison of two or more quantities of the same kind. It can be represented as a fraction. Therefore, it is evident from the basic concept of ratio is that a ratio is a fraction that shows how many times a quantity is of another quantity of the same kind.

**What is used to compare two or more quantities of the same kind measured in the same unit?**

Method of comparison of two quantities of the same kind (in same units) by division is known as ratio.

### Which two ratios represent quantities that are proportional?

Ratios are proportional if they represent the same relationship. One way to see if two ratios are proportional is to write them as fractions and then reduce them. If the reduced fractions are the same, your ratios are proportional.

### Is it possible to compare two same quantities?

We can only compare two same quantities i.e. the height of a person cannot be compared with the age of another person. Hence, there should be always a common reference point for comparison. Similarly, we need a standard measure or way for comparing quantities.

**When to use comparing quantities in Class 7?**

In the comparing quantities class 7 notes, there can be situations wherein different ratios may be compared with each other to know if they are equivalent or not. Different ratios need to be written infractions and then be compared by converting them into like fractions.

## When to use percentages to compare two quantities?

On comparison of the amount of different gases present in 1 gram of air, we can observe percentage is the easiest way for comparison. Thus, we can use this system of a percent to compare two quantities. But as mentioned above, comparing quantities must always be in the same unit. This was just a brief discussion on percentage.

## Are there any quantities of the same order of magnitude?

All quantities that can be expressed as a product of a specific power of 10 are said to be of the same order of magnitude. For example, the number 800 can be written as 8 × 10 2, and the number 450 can be written as 4.5 × 10 2. Thus, the numbers 800 and 450 are of the same order of magnitude: 10 2.