A recipe for 1 batch of spice mix says, “Combine 3 teaspoons of mustard seeds, 5 teaspoons of chili powder, and 1 teaspoon of salt.” 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[/img][br][br][br]How many batches are represented by the diagram? Explain your reasoning.

Find two more ratios of cups of sparkling water to cups of juice concentrate that would make a mixture that tastes the same as this recipe.

Describe another mixture of sparkling water and grape juice that would taste different than this recipe.[br]

The ratio of dogs to cats is ______ to ______.

The ratio of cats to dogs is ______ to ______.

For every ______ dogs there are ______ cats.

The ratio of cats to dogs is ______ : ______.

[size=150]Elena has 80 unit cubes. What is the volume of the largest cube she can build with them?[/size]

[math]3\cdot\frac{1}{3}[/math]=_____

[math]10\cdot\frac{1}{10}[/math]=_____

[math]19\cdot\frac{1}{19}[/math]=_____

[math]a\cdot\frac{1}{a}[/math]=_____[br](as long as [math]a[/math] does not equal 0.)

[math]5\cdot[/math]_____[math]=1[/math]

[math]17\cdot[/math]_____[math]=1[/math]

[math]b\cdot[/math]_____[math]=1[/math]