the density of an object has the equation d= m/v. if an object has a mass of 20 g and a volume of 3.5 cm3, what is it's density?

A.0.175 G/CM3
B.70 G/CM3
C.5.71 G/CM3
D.23.5 G/CM3

Answer:

10 goody bags.

Step-by-step explanation:

We are asked to find the largest number of identical goody bags that can be using 50 bouncy balls and 110 pokemon cards.

In order to solve our problem we will use GCF (Greatest common factor). Let us find out GCF of 50 and 110.

The factors of 50 are: 1, 2, 5, 10, 25, 50.

The factors of 110 are:  1, 2, 5, 10, 11, 22, 55, 110.

We can see that GCF of 50 and 110 is 10 as 10*11=110 and 10*5=50.

Therefore, the largest number of identical goody bags is 10 with 5 bouncy balls and 11 pokemon cards in each goody bag.

Answer:

[tex]\frac{5}{18}[/tex] square feet.

Step-by-step explanation:

We have been given that the length of a rectangular piece of wood is 5/12 foot and width is 2/3 foot.

Since area of a rectangle is width times length, so to find the area of piece of wood we will multiply 5/12 by 2/3.

[tex]\text{Area of wood}=\frac{5}{12}\times \frac{2}{3}[/tex]

[tex]\text{Area of wood}=\frac{5}{6}\times \frac{1}{3}[/tex]

[tex]\text{Area of wood}=\frac{5}{6\times 3}[/tex]

[tex]\text{Area of wood}=\frac{5}{18}[/tex]

Therefore, area of piece of wood will be [tex]\frac{5}{18}[/tex] square feet.

Solution:

[tex]\frac{1}{2}\times-4 \frac{4}{5}[/tex]

As one of the fraction is a proper fraction and another one is Mixed fraction.

There are two methods of solving it.

1. [tex]\frac{1}{2}\times-4 \frac{4}{5}=\frac{1}{2} \times \frac{-24}{5}=\frac{-12}{5}=-2\frac{2}{5}[/tex]

2. [tex]\frac{1}{2}\times-4 \frac{4}{5}=\frac{1}{2}[-4-\frac{4}{5}]=\frac{1}{2}\times (-4)+\frac{1}{2}\times\frac{-4}{5}=-2+\frac{-2}{5}=\frac{-10-2}{5}=\frac{-12}{5}=-2\frac{2}{5}[/tex]→→Here i have used Distributive property with respect to addition and Subtraction i.e a×(b+c)= a ×b + a×c or a×(b-c)=a×b-a×c

Now, you can fill the blanks by yourself.

Answer:Barbara writes each number as a fraction and then multiplies.

-24/5 -12/5

Answer:Christopher writes the mixed number as a sum and uses the distributive property.

-4 -4/5 -2 -2/5

Answer:Barbara's and Christopher’s answers will be equal. Write the answer as a mixed number in simplest form.

-2 2/5

Step-by-step explanation:

Answer:

y=7

Step-by-step explanation:

We know the tops 2 parts of the kite have to be equal

x+3 = 15

Subtract 3 from each side

x+3-3 =15-3

x=12

We also know the bottoms have to be equal

3y-1 =2x-4

Substitute the value for x

3y-1 =2(12) -4

3y-1 =24-4

3y-1 =20

Add 1 to each side

3y-1+1 =20+1

3y = 21

Divide each side by 3

3y/3 = 21/3

y = 7

Answer: 3996 meters

Step-by-step explanation:

Given: Maya is camping at the top of mount armstrong at an elevation of 7832 meters.

Consider the pont of sea level be 0.

Then the  height of the point where Mary is = +7832 meters (by using integers)

Juan is scuba diving 160 meters below sea level.

⇒The height of the point where Juan is =-160 meters

The distance between them =[tex]7832-(-160)=7832+160=7992\ meters[/tex]

The mid point of the distance= [tex]\frac{1}{2}\times7992=3996\ meters[/tex]

Hence, Maya & Juan meet will meet at an elevation of 3996 meters .

Final answer:

Maya and Juan will meet at an elevation of 3836 meters.

Explanation:

To find the elevation at which Maya and Juan will meet, we need to calculate the average of their elevations. Maya is at an elevation of 7832 meters and Juan is at an elevation 160 meters below sea level. The average of these two elevations is:

Average = (7832 + (-160)) / 2 = 3836 meters.

Therefore, Maya and Juan will meet at an elevation of 3836 meters.

First, let's ignore the answer choices and solve for a value of x ourselves.

2(8 - x) < 4

Distributive property.

16 - 2x < 4

Subtract 16 from both sides.

-2x < -12

Divide both sides by -2 (and flip the inequality sign)

x > 6

The value of x is going to be greater than 6, and so, we can observe the answer choices, and whichever value is greater than 6, is the correct answer.

Answer:

d x=10

Step-by-step explanation:

The total cost of painting and tiling a community hall shaped as a cuboid with the given dimensions is £972. This is based on calculating the surface area for paint and the floor area for tiles, then multiplying by the respective costs per m².

To solve this problem, we first need to figure out the total surface area of the cuboid, which will include the floor area for the tiles, and all sides for the paint.
Surface area of the cuboid involves calculating area for all six sides, which totals to 2*(lb + bh + hl), where l is length, b is breadth, and h is height.
Substituting the values given, the total surface area of the cuboid is 2*(40*15 + 15*3 + 3*40) = 2*(600 + 45 + 120) = 2*765 = 1530m2.
The floor area is length * breadth i.e., 40m * 3m = 120 m2.

Next, we calculate the cost of painting and tiling. We know 10 liters of paint covers 25 m2 and costs £10.
So, 1 litre covers 25/10 = 2.5m2 and similarly costs £10/10 = £1.
Therefore, the paint costs for 1530 m2 are 1530/2.5 = 612 litres * £1/litre = £612.

For tiling, the cost for 1m2 is £3, so for a 120 m2 floor, the cost will be 120m2*£3/m2 = £360.
Therefore, the total cost for paint and tiles is £612 + £360 = £972.

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Answer:

(-3, -1)

Step-by-step explanation:

As its reflected across the y-axis  the y coordinate remains the same but the new x-coordinate is the opposite value.

(x, y) → (x, y + n) - translate the graph n units up

(x, y) → (x, y - n) - translate the graph n units down

(x, y) → (x - n, y) - translate the graph n units left

(x, y) → (x + n, y) - translate the graph n units right

---------------------------------------------------------------------------

(x, y) → (x + 2, y)

translate the graph 2 units right.

Answer: 5 1/4 x 1 1/5 = 7 1/2 + 3/8 -> 7 7/8

The answer is 7 and 7/8

Answer

  [tex]y = -3x^2-4x+3[/tex]

Explanation

The standard form of a parabola is

  [tex]y = ax^2 + bx + c,[/tex]

where [tex]a \ne 0[/tex], and [tex]a,b,c[/tex] are real numbers.

If it passes through (0,3) then when x = 0, y = 3 so this means that

  [tex]3 = a(0)^2 + b(0) + c \implies c = 3[/tex]

so [tex]y = ax^2 + bx + 3[/tex].

If it passes through (1,-4), then when x = 1, y = -4 so

  [tex]\begin{aligned}-4 &= a(1)^2 + b(1) + 3 \\a+b+3 &= -4 \\a+b &= -7 && \text{(I).}\end{aligned}[/tex]

If it passes through (-1,4) then when x = -1, y = 4 so

  [tex]\begin{aligned}4 &= a(-1)^2 + b(-1) + 3 \\a-b+3 &= 4 \\a-b &= 1 && \text{(II).}\end{aligned}[/tex]

Because both (I) and (II) need to be satisfied, we have the system of equations,

  [tex]\begin{cases}a+b &= -7\qquad\text{(I)}\\a-b &= 1\qquad\text{(II)}\end{cases}[/tex]

which we can easily solve by adding the two equations up to get

  [tex]\begin{aligned}(a+a) + (b-b) &= -7 + 1 \\ 2a&= -6 \\a &= -3.\end{aligned}[/tex]

Then we take any of the previous equations to solve for b:

  [tex]\begin{aligned}a+b &= -7\\-3 + b &= -7 \\ b &= -4\end{aligned}[/tex]

Thus the parabola in standard form is

  [tex]y = -3x^2-4x+3.[/tex]

So with the three points that are given to us, we will plug them into the standard form formula that I had mentioned earlier. Firstly, plug (0,3) into the equation since the 0 will cancel out the a and b variable:

[tex]3=a*0^2+b*0+c\\3=c[/tex]

Now we know that the value of c is 3.

Next, plug (1,-4) into the standard form formula and simplify (Remember to plug 3 into the c variable):

[tex]-4=a*1^2+1*b+3\\-4=a+b+3\\-7=a+b[/tex]

Next, plug (-1,4) into the standard form formula and simplify:

[tex]4=a*(-1)^2+b*(-1)+3\\4=a-b+3\\1=a-b[/tex]

With the last two simplified equations, we will create a system of equations:

[tex]-7=a+b\\1=a-b[/tex]

With this, I will be using the elimination method. Add the two equations together, and the following equation is the result:

[tex]-6=2a[/tex]

From here we can solve for a. For this, just divide both sides by 2:

[tex]-3=a[/tex]

Now that we have the value of a, plug it into either equation to solve for b:

[tex]-7=-3+b\\-4=b\\\\1=-3-b\\4=-b\\-4=b[/tex]

Now, plug the obtained values in our standard form equation and your final answer will be:

[tex]y=-3x^2-4x+3[/tex]

Answer: 31 nickels and 29 dimes

Step-by-step explanation:

Nickels (.05): x

Dimes (.10): y

 Value:     .05x + .10y = 4.45 →  -20(.05x + .10y = 4.45)   →   -x - 2y = -89

Quantity:        x  +    y  = 60   →       1(x  +    y  = 60)           →   x  + y = 60

                                                                                                       -y  = -29

                                                                                                        y  =  29

Next, substitute "29" for "y" into either equation and solve for "x":

x +  y  = 60

x + 29 = 60

x          = 31

The number of nickels and dimes that are in the jar is 31 and 29 respectively.

Given that,

Based on the above information, the calculation is as follows:

x + y = 60 ........(1)

5x + 10y = 445.......(2)

Here we multiply by 5 in equation 1

5x + 5y = 300

5x + 10y = 445

-5y = 145

y = 29

So, x = 60 - 29

= 31

Therefore we can conclude that the number of nickels and dimes that are in the jar is 31 and 29 respectively.

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Answer:X=40

Step-by-step explanation:

3inx+2in(4)=in(128)

Step 1: Add -8in to both sides.

3inx+8in+−8in=128in+−8in

3inx=120in

Step 2: Divide both sides by 3

then you will get your answer

solve for x by simplifying both side of the equation the isolating the variable.    

x = 8/3 + 128/3in

By rearranging the formula for the volume of a cylinder to solve for height, and substituting the given values for volume and radius, we find that the height of the can is 5 inches.

To solve for the height h of the cylinder, we need to rearrange the formula for the volume of a cylinder, V =
2h, to solve for h. This is done by dividing both sides of the equation by
2, thus isolating h on one side of the equation.

The rearranged formula becomes:

h = V / (2)

Using the given volume of the can, 62.8 cubic inches, and the given radius of 2 inches, we plug these values into our formula:

h = 62.8 / (3.14 × 2²)

h = 62.8 / (3.14 × 4)

h = 62.8 / 12.56

h = 5 inches

Therefore, the height of the can is 5 inches.

Answer: 29

-------------------------

To get this answer, you subtract the largest and smallest values, which are also known as the max and min respectively

Range = Largest Value - Smallest Value

Range = Max - Min

Range = 65 - 36

Range = 29

If it helps, sort the data in order from smallest to largest to get this list of values: {36, 36, 41, 46, 50, 52, 56, 65} so you can see the min and max easier. The range is basically the spread of the data (more or less). The larger the range, the more spread out the data values are.

The range of the data set (36, 36, 41, 46,  50, 52, 56, 65) will be 29.

Statistics is the study of collection, analysis, interpretation, and presentation of data or to discipline to collect, and summarise the data.

The range of data gathering in statistics is the difference between the highest and smallest values, calculated by subtracting their sample maximum and minimum.

In a recent survey, 8 college graduates were each asked for the number of hours they work each week. Here is a list of the responses.

50, 52, 36, 46, 41, 36, 56, 65

Arrange the data in ascending order. Then we have

36, 36, 41, 46,  50, 52, 56, 65

Then the range of the data is given as,

Range = 65 - 36

Range = 29

The range of the data set  36, 36, 41, 46,  50, 52, 56, 65 will be 29.

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Answer:

The hourly rate of pay for:

Jude =$5 an hour

Ben = $4 an hour

Step-by-step explanation:

Let x represents Judy and y represents Ben.

As per the statement:Judy worked 8 hours and Ben worked 10 hours. Their combined pay was $80.

⇒[tex]8x + 10y =80[/tex]                     ......[1]

Also, it is given that When Judy worked 9 hours and Ben worked 5 hours, their combined pay was $65.

⇒[tex]9x+5y=65[/tex]                         .....[2]

Multiply equation [2] by 2 both sides we get;

[tex]2(9x+5y)=2 \cdot65[/tex]

18x + 10y = 130                                      .....[3]

Subtract [2] from [3] to eliminate y and solve for x;

18x + 10y -8x -10y = 130 -80

Simplify:

10x = 50

Divide both sides by 10 we get;

x = 5

⇒ Judy gets paid $5 an hour

Substitute value of x in [1] we get;

8(5) + 10y = 80

40 + 10y = 80

Subtract 40 from both sides we get;

40 + 10y - 40 = 80 -40

Simplify:

10 y = 40

Divide both sides by 10 we get;

y = 4

⇒Ben gets paid $4 an hour

Answer:

4

Step-by-step explanation:

40-24=16

16/4=4

4 tanks

Answer:

He will earn 13.91 after his raise.

Step-by-step explanation:

13 x .07 = .91

13.00 + .91 = 13.91

The amount Curtis earns per hour after his raise is 13 * (1 + 7%)

From the question, we have the following parameters that can be used in our computation:

Initial = $13

Raise =7%

using the above as a guide, we have the following:

New = Initial * (1 + raise)

So, we have

New = 13 * (1 + 7%)

Hence, the expression is 13 * (1 + 7%)

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Answer:

The larger number is 52.

Step-by-step explanation:

To find this number, we have to create a statement for both of the equations that are given.

x + y = 96

x - y = 8

Now we can add them together to solve for x (which is the larger number).

x + y = 96

x - y = 8

-------------

2x = 104

x = 52

Answer:

35% off, deducts $15.05

Step-by-step explanation:

The sale price was $27.95 and is 65% of the original price. This means the sale was 100%-65%= 35% off the original price.

We can create a proportion to find the original price to see how much was deducted. A proportion is an equation where two ratios are set equal to each other. We create two fractions using the prices and percents.

[tex]\frac{27.95}{x} =\frac{65}{100}[/tex]

We begin solving by cross multiplying numerator to denominator of each fraction.

[tex]27.95(100)=65(x)\\2795=65x\\\frac{2795}{65}=\frac{65x}{65}  \\43=x[/tex]

So the original price was $43. The sale price deducts 43-27.95= 15.05

Answer:

Step-by-step explanation:

160miles • 330miles= 52,800square miles

Now it wants the population density in people per square miles, so you need to divide the population by the number of square miles.  

4779736/52800=90.5 which is about 91people per square mile.  

The population density of Colorado is 48.09 people per mile²

Population density is the concentration of individuals within a specific area. It is given by:

Population density = number of people / land area

Land area = length  * width = 280 * 380 = 106400 mile²

Population density = 5,116,800 / 106400 = 48.09 people per mile²

The population density of Colorado is 48.09 people per mile²

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Answer:

The answer is $10.80

Step-by-step explanation:

It goes up $0.70 every mile and the flat fee is $3.10.

The equation 3.1 + 0.7(x) when x is the number of miles traveled.

Substitute 11 for x and get  3.1 + 0.7(11).

The answer is $10.80

The answer is B. 80.8

Answer:

The average of the whole class is 80.8.

The correct answer is B)

Step-by-step explanation:

To solve this problem, it is very important to understand the phrase: "Ten students had an average of 88". Let's see an example.

Imagine that three students in the class took a test and their scores were: 80, 89 and 95. To calculate the average of they three we must divide the sum of the scores by the total number of scores.

[tex]average=\frac{80+89+95}{3}=\frac{264}{3}=88[/tex]

The previous value is the average of the three students. Now, if we say that each student got 88, the average would be 88.

[tex]average=\frac{88+88+88}{3}=\frac{264}{3}=88[/tex]

The previous expression could be simplified as:

[tex]average=\frac{88\times 3}{3}[/tex]

Where, the number 3 means the number of students.

With that in mind, the phrase "Ten students had an average of 88" could be written as:

[tex]average_{10\, \, students}=\frac{88+88+88+88+88+88+88+88+88+88}{10}[/tex]

[tex]average_{10\, \, students}=\frac{88\times 10}{10}=88[/tex]

On the other hand, the phrase "The other students had an average of 76" means that from the 25 students, 15 students got 76 (25 - 10 = 15), and could be written as:

[tex]average_{15\, \, students}=\frac{76+76+76+76+76+76+76+76+76+76+76+76+76+76+76}{15}[/tex]

[tex]average_{15\, \, students}=\frac{76\times 15}{15}=76[/tex]

Finally, to calculate the total average of the 25 students we must divide the sum of the scores of all students by the total number of scores. The sum would be: 88+88+88+88+88+88+88+88+88+88+76+76+76+76+76+76+76+76+76+76+76+76+76+76+76, which equals [tex]88\times 10+76\times 15[/tex]. The total number of scores would be: 25.

[tex]average_{total}=\frac{88\times 10 + 76\times 15}{25}[/tex]

[tex]average_{total}=\frac{880 + 1140}{25}[/tex]

[tex]average_{total}=\frac{880 + 1140}{25}[/tex]

[tex]average_{total}=\frac{2020}{25}[/tex]

[tex]average_{total}=80.8[/tex]

Thus, the average of the whole class is 80.8. The correct answer is B)

Answer:

55 gallons

Step-by-step explanation:

Given that the diameter of the cylindrical barrel is 22 inches, so the radius of the barrel is [tex]\frac{22}{2}=11 \text{ inches}[/tex]

And height of the cylindrical barrel is 33.5 inches.

So the volume of oil in the cylindrical barrel is

[tex]=\pi r^2 h\\=\pi (11)^2(33.5)\\\\\approx 12734.45 \text{ cubic inches}[/tex]

Also given that there are 231 cubic inches in a liquid gallon, so to find the number of gallons of oil in barrel, we use unitary method.

231 cubic inches goes in = 1 gallon

1 cubic inches will go in [tex]=\frac{1}{231} \text{ gallon}[/tex]

[tex]\text{12734.45 cubic inches oil will go in}=\frac{1}{231}\times 12734.45\approx 55.12 \text{ gallons}\\\\\text{hence there are approximately 55 gallons of oil in the barrel}[/tex]

Answer:

55

Step-by-step explanation:

A, B,  C, and E are not polynomials.

A polynomial is an expression involving exponents, constants, and variables, so long as:

You are not dividing by a variable.

You are not raising a variable to a power of a negative number.

You are not raising a variable to a power of a fraction.

You are not taking the root of a variable.

Only one of these satisfies the criteria for a polynomial, and that is D. However, the 2nd term, 0x^2 is an unnecessary term, and would only be included if dividing this polynomial by another polynomial.

Answer:

          7 sqrt(3) =x

Step-by-step explanation:

We know that sin 60 = opposite / hypotenuse

                       sin 60 = x/14

Multiply both sides by 14

                          14 sin 60 = x

                        14 * (sqrt(3)/2) =x

                      7 sqrt(3) =x