7. the table shows the relationship between the different colors needed to make a shade of purple paint and the total amount of paint. write a part - to - part and a part - to - whole ratio that represents the relationship in the table. then use the ratios to find the unknown values. (example 3)
| blue (fl oz) | 10 | 15 | | 25 |
| --- | --- | --- | --- | --- |
| red (fl oz) | 6 | | | |
| total paint (fl oz) | 16 | | 32 | 40 |

Question

7. the table shows the relationship between the different colors needed to make a shade of purple paint and the total amount of paint. write a part - to - part and a part - to - whole ratio that represents the relationship in the table. then use the ratios to find the unknown values. (example 3)
| blue (fl oz) | 10 | 15 |  | 25 |
| --- | --- | --- | --- | --- |
| red (fl oz) | 6 |  |  |  |
| total paint (fl oz) | 16 |  | 32 | 40 |

Accepted Answer

# Explanation:
## Step1: Find the ratio of Blue to Red (part - to - part)
From the first row, Blue = 10 fl oz and Red = 6 fl oz. So the ratio of Blue to Red is $\frac{10}{6}=\frac{5}{3}$. Also, the ratio of Red to Blue is $\frac{6}{10}=\frac{3}{5}$. The total paint is Blue + Red, so 10 + 6 = 16 fl oz, which matches the first total.

## Step2: Find the ratio of Blue to Total (part - to - whole)
Blue = 10, Total = 16, so the ratio of Blue to Total is $\frac{10}{16}=\frac{5}{8}$. The ratio of Red to Total is $\frac{6}{16}=\frac{3}{8}$.

## Step3: Calculate the second row (Blue = 15)
### Sub - step 3.1: Find Red when Blue = 15 (using Blue to Red ratio $\frac{5}{3}$)
Let Red be $x$. Then $\frac{15}{x}=\frac{5}{3}$. Cross - multiply: $5x = 15	imes3\Rightarrow5x = 45\Rightarrow x = 9$.
### Sub - step 3.2: Find Total when Blue = 15 and Red = 9
Total = 15 + 9 = 24.

## Step4: Calculate the third row (Total = 32)
### Sub - step 4.1: Find Blue when Total = 32 (using Blue to Total ratio $\frac{5}{8}$)
Let Blue be $y$. Then $\frac{y}{32}=\frac{5}{8}$. Cross - multiply: $8y=32	imes5\Rightarrow8y = 160\Rightarrow y = 20$.
### Sub - step 4.2: Find Red when Total = 32 and Blue = 20
Red = 32 - 20 = 12.

## Step5: Calculate the fourth row (Blue = 25)
### Sub - step 5.1: Find Red when Blue = 25 (using Blue to Red ratio $\frac{5}{3}$)
Let Red be $z$. Then $\frac{25}{z}=\frac{5}{3}$. Cross - multiply: $5z = 25	imes3\Rightarrow5z = 75\Rightarrow z = 15$.
### Sub - step 5.2: Verify with Total (Blue + Red)
Total = 25+15 = 40, which matches the given total.

# Answer:
- Part - to - part ratio (Blue to Red): $\boldsymbol{\frac{5}{3}}$ (or Red to Blue: $\boldsymbol{\frac{3}{5}}$)
- Part - to - whole ratio (Blue to Total): $\boldsymbol{\frac{5}{8}}$ (or Red to Total: $\boldsymbol{\frac{3}{8}}$)

### Filled Table:
| Blue (fl oz) | 10 | 15 | 20 | 25 |
|--------------|----|----|----|----|
| Red (fl oz)  | 6  | 9  | 12 | 15 |
| Total Paint (fl oz) | 16 | 24 | 32 | 40 |

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QUESTION IMAGE

Question

Explanation:

Step1: Find the ratio of Blue to Red (part - to - part)

Step2: Find the ratio of Blue to Total (part - to - whole)

Step3: Calculate the second row (Blue = 15)

Sub - step 3.1: Find Red when Blue = 15 (using Blue to Red ratio $\frac{5}{3}$)

Sub - step 3.2: Find Total when Blue = 15 and Red = 9

Step4: Calculate the third row (Total = 32)

Sub - step 4.1: Find Blue when Total = 32 (using Blue to Total ratio $\frac{5}{8}$)

Sub - step 4.2: Find Red when Total = 32 and Blue = 20

Step5: Calculate the fourth row (Blue = 25)

Sub - step 5.1: Find Red when Blue = 25 (using Blue to Red ratio $\frac{5}{3}$)

Sub - step 5.2: Verify with Total (Blue + Red)

Answer:

Filled Table: