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Ratio in Lowest Term | Expressing Ratio in the Simplest Form || @Education with Asma || Grade Vi,Vii
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@EducationwithAsma
Hello students
hope you all are fine
Both class Vi,Vii
class -06
Chapter- 06
Exercise -6.1
Sub:Math sindh text board
Today topic:
(Ratio in Lowest Term | Expressing Ratio in the Simplest Form )
What is equivalent ratio for the Grade 6?
Equivalent ratios have the same value. To determine whether two ratios are equivalent, write them as fractions. If the fractions are equal, the ratios are equivalent.
(Here we will learn how to make the ratio in simplest form.)
1. A ratio between two quantities of same kind and in the same units is obtained on dividing one quantity by the other and has no unit. The ratio is independent of the units used in the quantities compared.
2. The ratio must always be expressed in its simplest form or in its lowest terms.
A ratio is said to be is the simplest form or in the lowest term if two quantities of a ratio (i.e., antecedent and consequent) have no common factor (i.e. antecedent and consequent are co-prime) other than 1 (or their HCF is 1.)
For example:
(i) The ratio between 36 kg and 24 kg = (36 kg)/(24 kg)
= 36/24, [both numerator and denominator are divided by 12]
= 3/2
= 3 : 2.
3. If in a ratio the number or quantities are of the same kind but in different units, then we must convert them number or quantities into same unit. Generally, the bigger unit of the ratio is converted into smaller unit.
For example:
(i) The ratio between 800 g and 1.2 kg = (800 g)/(1200 g)
= 800/1200, [since 1.2 kg = 1.2 × 1000 gm = 1200 gm]
= 8/12, [both numerator and denominator are divided by 4]
= 2/3
= 2 : 3.
4. If each term of a ratio is multiplied or divided by the same non-zero number (quantity), the ratio remains the same.
For example:
The ratio of 18 and 24= 18 : 24 = 18/24
Now, 18/24 = (18 × 6)/(24 × 6) = 108/144 or, 18 : 24 = 108 : 144.
Again, 18/24 = (18 ÷ 6)/(24 ÷ 6) = 3/4 or, 18 : 24 = 3 : 4.
5. The order of the quantities (terms) in a ratio (P : Q) is important. By reversing the antecedent and the consequent of a ratio, a different ratio is obtained (i.e., Q : P).
For example:
(i) The ratio 5 : 7 is different from the ratio 7 : 5.
(ii) 6 : 11 is different from 11 : 6.
The different types of examples along with the explanation will help us how we usually express the ratio in simplest form.
PREVIOUS TOPICS GIVEN BELOW:
I hope you understand
PLEASE SUBSCRIBE MY CHANNEL AND SHARE PLEASE
THANK YOU SOO MUCH
ALLAH HAFIZzz.
Hello students
hope you all are fine
Both class Vi,Vii
class -06
Chapter- 06
Exercise -6.1
Sub:Math sindh text board
Today topic:
(Ratio in Lowest Term | Expressing Ratio in the Simplest Form )
What is equivalent ratio for the Grade 6?
Equivalent ratios have the same value. To determine whether two ratios are equivalent, write them as fractions. If the fractions are equal, the ratios are equivalent.
(Here we will learn how to make the ratio in simplest form.)
1. A ratio between two quantities of same kind and in the same units is obtained on dividing one quantity by the other and has no unit. The ratio is independent of the units used in the quantities compared.
2. The ratio must always be expressed in its simplest form or in its lowest terms.
A ratio is said to be is the simplest form or in the lowest term if two quantities of a ratio (i.e., antecedent and consequent) have no common factor (i.e. antecedent and consequent are co-prime) other than 1 (or their HCF is 1.)
For example:
(i) The ratio between 36 kg and 24 kg = (36 kg)/(24 kg)
= 36/24, [both numerator and denominator are divided by 12]
= 3/2
= 3 : 2.
3. If in a ratio the number or quantities are of the same kind but in different units, then we must convert them number or quantities into same unit. Generally, the bigger unit of the ratio is converted into smaller unit.
For example:
(i) The ratio between 800 g and 1.2 kg = (800 g)/(1200 g)
= 800/1200, [since 1.2 kg = 1.2 × 1000 gm = 1200 gm]
= 8/12, [both numerator and denominator are divided by 4]
= 2/3
= 2 : 3.
4. If each term of a ratio is multiplied or divided by the same non-zero number (quantity), the ratio remains the same.
For example:
The ratio of 18 and 24= 18 : 24 = 18/24
Now, 18/24 = (18 × 6)/(24 × 6) = 108/144 or, 18 : 24 = 108 : 144.
Again, 18/24 = (18 ÷ 6)/(24 ÷ 6) = 3/4 or, 18 : 24 = 3 : 4.
5. The order of the quantities (terms) in a ratio (P : Q) is important. By reversing the antecedent and the consequent of a ratio, a different ratio is obtained (i.e., Q : P).
For example:
(i) The ratio 5 : 7 is different from the ratio 7 : 5.
(ii) 6 : 11 is different from 11 : 6.
The different types of examples along with the explanation will help us how we usually express the ratio in simplest form.
PREVIOUS TOPICS GIVEN BELOW:
I hope you understand
PLEASE SUBSCRIBE MY CHANNEL AND SHARE PLEASE
THANK YOU SOO MUCH
ALLAH HAFIZzz.
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