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Julius is buying beverages for brunch he needs to buy a total of 5 gallons of beverages he decides to buy two containers of each of the following beverages 2 pints of milk 2 quarts of orange juice 16 cups of milk 32 oz of lemonade . how many gallons of beverages did he buy

2 months ago

Solution 1

Guest #3252

2 months ago

This will be calculated as follows:
1 pint=0.125 gallons
1 quart=0.25 gallons
1 cup = 0.0625 gallons
1 oz = 0.0078125 gallons
thus amount of :
milk bought
0.125*2=0.25 gallons

orange juice bought:
0.25*2=0.5 gallons

milk bought:
16*0.0625=1 gallon

lemonade bought:
32*0.0078125=0.25 gallons

Thus total gallons made was:
0.25+1+0.5+0.25
=2 gallons

Solution 2

Guest #3253

2 months ago

The amount of beverages did he buy will be 2 gallons.

What is conversion?

Conversion means to convert the same thing into different units.

Julius is buying beverages for brunch he needs to buy a total of 5 gallons of beverages he decides to buy two containers of each of the following beverages 2 pints of milk, 2 quarts of orange juice, 16 cups of milk, and 32 oz of lemonade.

We know the conversion

1 pint = 0.125 gallons

1 quart = 0.25 gallons

1 cup = 0.0625 gallons

1 oz = 0.0078125 gallons

Then the amount of beverages did he buy will be

Milk bought

0.125 x 2 = 0.25 gallons

Orange juice bought:

0.25 x 2 = 0.5 gallons

Milk bought:

16 x 0.0625 = 1 gallon

Lemonade bought:

32 x 0.0078125 = 0.25 gallons

Thus total gallons made will be

→ 0.25 + 1 + 0.5 + 0.25

→ 2 gallons

More about the conversion link is given below.

brainly.com/question/9414705

#SPJ2

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Solution 1

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Equation of the appreciation of the value of house is given by:-

$y=150000(1.004)^{12t}$

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So, that means time, t=8

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A right triangle has one side, s, and a hypotenuse of 12 meters. Find the area of the triangle as a function of s. A) A(s) = 2s 144 - s2 B) A(s) = s 144 - s2 C) A(s) = 2s 12 - s2 D) A(s) = 12s 144 - s2 10) The base of a ladder is placed 5 feet away from a 13 foot tall wall. What is the minimum length ladder needed to reach the top of the wall (rounded to the nearest foot)? A) 12 ft B) 13 ft C) 14 ft D) 15 ft

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Part a)
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Solution 1

Answer: A(s) = $\frac{s\sqrt{144-s^{2} } }{2}$ ; 10) c) 14ft

Step-by-step explanation: Area of a triangle is: A = $\frac{b.h}{2}$

where:

b is base of a triangle

h is height of a triangle

For this right triangle, it is known one side, s, and hypotenuse, 12. To determine the other side, we use Pythagoras Theorem:

hypotenuse² = side² + side²

$12^{2} = s^{2} + x^{2}$

$x^{2} = 12^{2} - s^{2}$

$x^{2} = 144 - s^{2}$

x = $\sqrt{144 - s^{2} }$

To determine the Area of the right triangle as function of s:

A = $\frac{b.h}{2}$

A = $\frac{1}{2}$ (s.x)

A = $\frac{1}{2}$ . (s. $\sqrt{144 - s^{2} }$ )

Therefore, the area of the right triangle is:

A = $\frac{1}{2}$ . (s. $\sqrt{144 - s^{2} }$ )

The ladder and the wall form a right triangle. The height of it is 13 ft, the base is 5ft and the hypotenuse is the length of the ladder. So, to find the minimum length, use Pythagoras Theorem:

hypotenuse² = side² + side²

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