No because it's the same thing but in a different way.😊
no because its the same thing but in a different way😊
The parts of a ratio are called the "terms" of the ratio. Typically, a ratio consists of two terms: the first term is referred to as the "antecedent," and the second term is known as the "consequent." For example, in the ratio 3:2, 3 is the antecedent, and 2 is the consequent.
The second term in the ratio is 1.
The term of a ratio can be described as the individual components or values that make up the ratio. For example, in the ratio 3:2, the terms are 3 and 2, representing the quantities being compared. Terms can also be referred to as the antecedent (the first term) and the consequent (the second term) in a ratio. Each term provides insight into the proportional relationship between the quantities involved.
A percentage.
No because it's the same thing but in a different way.😊
A ratio is a comparison of two quantities. When the second term of a ratio is 100, it means that the ratio is comparing the first term to 100. For example, if the ratio is 1:100, it means the first term is 1 and the second term is 100. Ratios with a second term of 100 are often used to express proportions or percentages.
no
Antecedent is the first term in a ratio .
no because its the same thing but in a different way😊
In a sequence, the ratio of the third term to the second term is the one successive from the ratio of the second to the first. The successive ratios are : u2/u1, u3/u2, u4/u3 and so on. In a geometric sequence, these would all be the same.
The parts of a ratio are called the "terms" of the ratio. Typically, a ratio consists of two terms: the first term is referred to as the "antecedent," and the second term is known as the "consequent." For example, in the ratio 3:2, 3 is the antecedent, and 2 is the consequent.
The second term in the ratio is 1.
The term of a ratio can be described as the individual components or values that make up the ratio. For example, in the ratio 3:2, the terms are 3 and 2, representing the quantities being compared. Terms can also be referred to as the antecedent (the first term) and the consequent (the second term) in a ratio. Each term provides insight into the proportional relationship between the quantities involved.
It is 7/11 = 0.63636... recurring.
A percentage.
To express a ratio as a unit rate, divide both terms of the ratio by the second term. This simplifies the ratio to a value per one unit of the second term. For example, if you have a ratio of 10 miles to 2 hours, you would divide both numbers by 2, resulting in a unit rate of 5 miles per hour. This indicates how many units of the first quantity correspond to one unit of the second quantity.