Common Core: 7th Grade Math : Ratios & Proportional Relationships

Study concepts, example questions & explanations for Common Core: 7th Grade Math

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Example Questions

Example Question #19 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #15 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #21 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #131 : Ratios & Proportional Relationships

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #23 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #21 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the equation provided, identify the constant of proportionality (i.e. the unit rate).

 

Possible Answers:

Correct answer:

Explanation:

The constant of proportionality can be identified using the following general equation:

In this equation, the variable, , represents the constant of proportionality. 

Let's look at the given equation:

In this example,  is in the place of ; therefore,  is the constant of proportionality. 

Example Question #23 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the table provided, identify the constant of proportionality (i.e. the unit rate).

Screen shot 2016 02 17 at 3.57.13 pm

Possible Answers:

Correct answer:

Explanation:

In order to determine the constant of proportionality, we will divide the quantities in the  coordinate column by the quantities in the  coordinate column. In order for the table to show direct proportion, each quotient should be the same value. 

In this example, the constant of proportionality is 

Screen shot 2016 02 17 at 3.57.19 pm

Example Question #24 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the table provided, identify the constant of proportionality (i.e. the unit rate).


Screen shot 2016 02 17 at 3.57.26 pm

Possible Answers:

Correct answer:

Explanation:

In order to determine the constant of proportionality, we will divide the quantities in the  coordinate column by the quantities in the  coordinate column. In order for the table to show direct proportion, each quotient should be the same value. 

In this example, the constant of proportionality is 

Screen shot 2016 02 17 at 3.57.30 pm

Example Question #25 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the table provided, identify the constant of proportionality (i.e. the unit rate).


Screen shot 2016 02 17 at 3.57.36 pm

Possible Answers:

Correct answer:

Explanation:

In order to determine the constant of proportionality, we will divide the quantities in the  coordinate column by the quantities in the  coordinate column. In order for the table to show direct proportion, each quotient should be the same value. 

In this example, the constant of proportionality is 

Screen shot 2016 02 17 at 3.57.41 pm

Example Question #26 : Identify The Constant Of Prportionality: Ccss.Math.Content.7.Rp.A.2b

In the table provided, identify the constant of proportionality (i.e. the unit rate).


Screen shot 2016 02 17 at 3.57.45 pm

Possible Answers:

Correct answer:

Explanation:

In order to determine the constant of proportionality, we will divide the quantities in the  coordinate column by the quantities in the  coordinate column. In order for the table to show direct proportion, each quotient should be the same value. 

In this example, the constant of proportionality is 

Screen shot 2016 02 17 at 3.57.51 pm

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