Greatest to least .01 1/8 .23 1/5

Answer:

The answer is $3277.48

Step-by-step explanation:

An Annual Percentage Rate or APR is calculated by taking into account the interest rate on a credit card (or another borrowed sum) and any other charges such as an annual fee or arrangement fee.

So the first step here is to calculate the 3.5% cash advance fee on cash advance of $2790.00.

$2790.00 × 3.5%

2790 × (3.5 ÷ 100)

2790 × 0.035

$97.65

Now APR is calculated on the sum of cash advance and cash advance fee, i.e.,

13.5% × (2790 + 97.65)

13.5% × 2887.65

( 13.5 ÷ 100 ) × 2887.65

0.135 × 2887.65

$389.83

The total amount due at the end of the month is sum of Cash advance, Cash advance fee and APR

$2790 + $97.65 +$389.83 = $3277.48

3.277.48

this a a short answear

Answer:

3(m - 32.97) = 3.09

Step-by-step explanation:

She started with m money for each of the three children.

A pair of pants costs $12.99. Each polo shirt costs $9.99.

A pair of pants and 2 polo shirts cost

$12.99 + 2 * $9.99 = $12.99 + $19.98 = $32.97

For each child, she had m money and spent $32.97.

For each child, she had m - 32.97 money left.

For the three children, the amount of money left was 3(m - 32.97).

We are told that for the three children, the amount of money left is $3.09.

That means that 3(m - 32.97) must equal $3.09.

The equation is:

3(m - 32.97) = 3.09

Answer:

Ambitious

In this case, you have to multiply the price of the one way journey ($2.65) by 8 (as this is the number of individual journeys made in one week. It's gives you $21.20. As he has 1 bottle of water at $1.45 each day for four days, you have to multiply these together, giving you $5.80 You then have to add together $21.20 and $5.80, giving you $27. Therefore, it costs Edgar $27 a week

Step-by-step explanation:

Answer:

$27.00

Step-by-step explanation:

To ride the bus to and from work costs

2* 2.65 = 5.30  for 1 day

He rides the bus 4 days a week

4 * 5.30 = 21.20      for 4 days

He buys a bottle of water on the way to work 4 days a week

4 * 1.45 = 5.80  for 4 days

Cost to ride the bus = bus fare for 4 days + water for 4 days

                                    = 21.20 + 5.80

                                     = 27.00

4 (2*2.65+ 1.45) = 27

Answers:

1) Given

2) angle 2 ** see note below

3) angle 3 ** see note below

4) converse of alternate exterior angle theorem

note: you can swap the answers for 2 and 3 and it doesn't matter

========================================================

Explanations:

1) This is given so we just simply state "given". It seems silly to repeat what is given, but this is how you start any geometry proof.

2 & 3) The answers here are angle 2 and angle 3 because they are both interior angles (on the inside of the parallel lines m and L) and they are on alternate sides of the transversal line q. So they are both alternate interior angles and are congruent due to line L parallel to line m (alternate interior angle theorem)

4) If you have a pair of parallel lines, then the alternate exterior angle theorem says that alternate exterior angles are congruent. Going in reverse, the converse of this theorem says that having a pair of congruent alternate exterior angles (angle 1, angle 2) leads to the lines being parallel (p and q).

A well-structured paragraph should have unity under a single thesis, clear topics, and relevant evidence. The analysis of the evidence reinforces the main point.

A well-structured paragraph should have unity under a single thesis, clear topics supported by relevant evidence, and appropriate transitions. The supporting evidence can include facts, statistics, expert opinions, and examples. The analysis of the evidence should explain its significance and reinforce the main point of the paragraph.

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Answer: The length of the united states flag is [tex]2\frac{2}{19}\ feet[/tex]

Step-by-step explanation:

Since we have given that

Ratio of width to length of the united states flag is 10:19

So, Let the length of the united states flag be 10x

Let the width of the united states flag is 19x

As we have the width of the flag of Emerson's school = 4 feet.

According to question,

[tex]19x=4\\\\x=\frac{4}{19}[/tex]

So, our length of the united states flag will be

[tex]10x=10\times \frac{4}{19}\\\\=\frac{40}{19}\\\\=2\frac{2}{19}\ feet[/tex]

Hence, the length of the united states flag is [tex]2\frac{2}{19}\ feet[/tex]

Final answer:

To find the length of the flag, you can set up a proportion using the given ratio of width to length. Solve for the unknown length by cross-multiplying and dividing. The length in feet is found by multiplying the width of Emerson's School flag by the ratio and dividing by 10.

Explanation:

To find the length of the United States flag, you can set up a proportion using the given ratio of width to length. The ratio is 10:19, and the width of Emerson's School flag is 4 ft. First, write the proportion using the length as the unknown value: 10/19 = 4/L. To solve for L, cross-multiply and divide: 10L = 4 * 19. Divide both sides by 10 to find the length:

L = (4 * 19) / 10.

Multiply 4 and 19, then divide by 10 to get the length in feet.

L= 7.6

Answer:

common difference: 14

Step-by-step explanation: You have to find out what number it takes to add to the number to get the following number. ex 11+14=25      25+14=39 etc

Answer:

The common difference of the arithmetic sequence is 14.

Step-by-step explanation:

The arithmetic sequence is defined as

x:   1     2    3    4    5

y:  11   25  39  53   67

The common difference of the arithmetic sequence is

[tex]d=\frac{y_2-y_1}{x_2-x_1}[/tex]

Consider any two points, i.e.,(1,11) and (2,25).

[tex]d=\frac{25-11}{2-1}[/tex]

[tex]d=\frac{14}{1}[/tex]

[tex]d=14[/tex]

Therefore the common difference of the arithmetic sequence is 14.

Answer:

C = 79, B = 26 degrees

Step-by-step explanation:

tan C = 5.1323

To find C you  use your calculator . Press tan-1 ( or it might be arctan) then the value 5.1323 Then ENTER.

C =  79 degrees to nearest degree.

cos B = 0.8954

B = 26 degrees

The nearest degree, of C =79 degrees

The nearest degree, of B = 26 degrees

tan C = 5.1323

To find C you use your calculator. Press tan-1 ( or it might be arctan) then the value 5.1323 Then

C =  79 degrees to nearest degree.

cos B = 0.8954

B = 26 degrees.

The angle of the trigonometric function is the angle given by the ratio of the trigonometric functions. Trigonometry involves studying the relationship between angles and the sides of a triangle. Angle values ​​range from 0 to 360 degrees. The important angles of trigonometry are 0 °, 30 °, 45 °, 60 °, 90 °, 180 °, 270 °, and 360 °.

The angle at which the vertex is at the origin and one side is on the positive x-axis. Can take positive or negative dimensions and can be larger than 360 °

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there are 60 minutes in 1 hr.

every 10 minutes the factory makes 15 bears.

so 10+10+10+10+10+10 is 1 hr, and is really 15+15+15+15+15+15 bears, namely 90 per hour.

every day, the factory does that for 8 hours straight, so namely they make 90 * 8 teddy bears, or 720 per day.

let's make a table of bears per day

1 day............................... 720(1)

2 days............................ 720(2)

3 days............................ 720(3)

4 days............................ 720(4)

x days............................ 720(x)

so the amount of bears they make say "A" is per day is A = 720x.

what would be the fewest days to make 5000?

well, whatever 720x is, it has to be either 5000 exactly OR more, not less, then

5000 ⩽ 720x.

and dividing both sides by 720 we get about 6.94 ⩽ x.

so we can conclude that whole days, it'll be 7, since 6.94 is about 7 days, but rounded up to whole days it'll be 7 days.

Answer:

Wanda and Dave will catch each other in 54 seconds after Dave starts walking.

Step-by-step explanation:

Let Wanda and Dave catch each other when x be the time after Dave starts walking and y be the distance covered by them

It is given that Wanda started walking along a path 27 seconds before Dave and the constant speed of Wanda is 3 feet per second.

[tex]speed=\frac{distance}{time}[/tex]

[tex]3=\frac{y}{x+27}[/tex]

[tex]y=3(x+27)[/tex]

 [tex]y=3x+81[/tex]                          .... (1)

The constant speed of Dave is 4.5 feet per second.

[tex]4.5=\frac{y}{x}[/tex]

[tex]y=4.5x[/tex]                                .... (2)

Equate equation (1) and (2).

[tex]3x+81=4.5x[/tex]

[tex]81=1.5x[/tex]

Divide both sides by 1.5.

[tex]\frac{81}{1.5}=x[/tex]

[tex]54=x[/tex]

Therefore, Wanda and Dave will catch each other in 54 seconds after Dave starts walking.

Answer:

SSS - This means side side side. You must have 3 congruent sides in both triangles to prove them congruent.

SAS - This means side angle side. You must have 2 sides and an included angle in both triangles to prove them congruent.

ASA - This means angle side angle. You must have 2 angles and an included side in both triangles to prove them congruent.

AAS - This means angle angle side. You must have 2 angles and a side in both triangles to prove them congruent.

NOTE: included basically means in between.

Answer:

D

Step-by-step explanation:

B,C don't have enough candles and a cost too much.

Answer:

D. (18,11)

Step-by-step explanation:

The last option is the one that makes the most sense for Jose. Jose needs to buy small and large candles. Small candles are $3 while large candles are $5. His budget is $120 and he needs at least 25 candles. If Jose picks option D, he would be able to buy:

18 small candles = 54

11 large candles = 55

Therefore,

18 + 11 = 29 candles

54+ 55 = $109

Answer:

The required equation is [tex]\angle W+3\angle W=180^{\circ}[/tex].

Step-by-step explanation:

Given information: WXYZ is a parallelogram, W and X are adjacent interior angles and measure of X is three times the measure of W.

According to the properties of parallelogram, the two adjacent interior angle are supplementary angle and their sum is 180 degrees.

[tex]\angle W+\angle X=180^{\circ}[/tex]            .... (1)

It is also given that the measure of X is three times the measure of W.

[tex]\angle X=3\angle W[/tex]

Substitute this value in equation 1.

[tex]\angle W+3\angle W=180^{\circ}[/tex]

[tex]4\angle W=180^{\circ}[/tex]

[tex]\angle W=45^{\circ}[/tex]

Substitute this value in equation 1.

[tex]\angle W=135^{\circ}[/tex]

Therefore the required equation is [tex]\angle W+3\angle W=180^{\circ}[/tex].

Answer:

A = pi/2

Step-by-step explanation:

Area of a sector is given by

A = 1/2 r^2 theta when theta is given in radians

We know the area of the circle (pi * r^2) so we multiply by pi/pi

A = 1/2  pi/pi r^2 theta

A = 1/(2* pi)  * pi r^2 theta  

   =  1/(2* pi)  * Ac theta   where Ac is the area of a circle

Substituting what we know  Ac = 9 pi and theta = 1/9 * pi

A    =  1/(2* pi)  * 9*pi  1/9 * pi

A = 1/(2* pi)  * pi^2

A = 1/2 * pi

A = pi/2

Answer:

Its [tex]\frac{\pi }{2}[/tex] .

Step-by-step explanation:

Because the work shown below will show you how:

[tex]\frac{\theta}{2\pi } = \frac{A_s}{A_c}\\\frac{1}{9} /2\pi = \frac{A_s}{9\pi } \\\frac{1}{18} = \frac{A_s}{9\pi } \\\frac{1}{18} * 9\pi = A_s\\=\pi/2[/tex]

[tex]-\dfrac{1}{2}x+4=x+1\qquad\text{multiply both sides by 2}\\\\-x+8=2x+2\qquad\text{subtract 8 from both sides}\\\\-x=2x-6\qquad\text{subtract 2x from both sides}\\\\-3x=-6\qquad\text{divide both sides by (-3)}\\\\\boxed{x=2}[/tex]

Answer:

[tex]-135\degree=-\frac{3}{4}\pi\: radians.[/tex]

Step-by-step explanation:

This question demands that we convert from a degree measure to a radian measure.

To convert from a degree measure to radians, multiply by [tex]\frac{\pi}{180\degree}[/tex].

That is [tex]-135\degree=-135\degree \times \frac{\pi}{180\degree}[/tex].

This can be simplified by canceling out the common factors to get,

[tex]-135\degree=-3\times45\degree \times \frac{\pi}{4\times 45\degree}[/tex].

This will give us,

[tex]-135\degree=-\frac{3}{4}\pi\: radians.[/tex]

Answer:

- 3pi over 4

Step-by-step explanation:

The initial room temperature was -20 degrees Celsius.

The temperature in the room decreases by 0.5 degrees Celsius per minute.

After Quinn slept for 60 minutes, the room's temperature became 10 degrees Celsius.

We can calculate the initial room temperature by subtracting the total decrease in temperature from the final temperature:

Initial temperature = Final temperature + (Rate of temperature decrease * Time)

Initial temperature = 10 + (-0.5 * 60) = 10 + (-30) = 10 - 30 = -20 degrees Celsius

Therefore, the initial room temperature was -20 degrees Celsius.

Final answer:

The final temperature of the room after 60 minutes of the air conditioner being on is -20°C.

Explanation:

In this question, we are given the initial temperature of the room and the rate at which the temperature decreases. We are also given the time period for which the air conditioner was on. We need to determine the temperature after the given time period.

Given: Initial temperature = 10°C, Rate of temperature decrease = 0.5°C/min, Time period = 60 min.

To calculate the final temperature, we need to multiply the rate of temperature decrease by the time period and subtract this value from the initial temperature.

Final temperature = Initial temperature - (Rate of temperature decrease * Time period) = 10°C - (0.5°C/min * 60 min) = 10°C - 30°C = -20°C.

To solve for the number of zeros in the product of (6x5) x 10³, one should first multiply the whole numbers (6x5) to get 30. Then, append as many zeros as the power of 10, which in this case is 3. So, we append three 0's to 30 which yields 30000. This gives us four zeros in total.

The problem (6x5) x 10³ refers to a multiplication involving whole numbers and a power of ten. Our task is to find out how many zeros will be in the resulting product.

Step 1: Multiply the whole numbers. 6x5 equals 30.

Step 2: When multiplying by a power of ten, you add as many zeros to the end of the number as there are in the exponent of ten. So, in this case, as it is power of ten to the power of 3 (10³), we would add three 0's.

Final result: 30000.

So, the product (6x5) x 10³ will have four zeros.

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Answer:

The answer would be A.) 21 gallons.

Step-by-step explanation:

1.) The first thing you need to do is see how many miles per gallon the van is using by doing 168/14= 12.

2.) Then, you would apply this to the amount need to travel by doing 252/12= 21, meaning the answer is in fact A.) 21 gallons.

To find out how many gallons of gas a van would need to travel 252 miles, given that it travels 168 miles on 14 gallons, you can use a simple ratio and proportion calculation. This yields that the van would need 21 gallons to travel 252 miles.

The subject here is the mileage of a van, which is a problem of ratio and proportion. Given that the van travels 168 miles on 14 gallons of gas, we can find out how much it would need to travel 252 miles. We set up the proportion as follows:

168 miles / 14 gallons = 252 miles / X gallons

To find X (the unknown), we cross multiply:

168 * X = 252 * 14

After solving this equation, we find that X equals 21. Therefore, the van would need 21 gallons to travel 252 miles.

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Answer:

x = 20

Step-by-step explanation:

To find the midpoint of a segment, add the lengths and divide by 2

If y is the midpoint the 2 parts have to be equal.

XY = YZ

2(3x+1) = 5x+22

Distribute

6x+2 = 5x+22

Subtract 5x from each side

6x-5x +2 = 5x-5x+22

x+2 =22

Subtract 2 from each side

x+2-2=22-2

x=20

Answer:

x=20

Step-by-step explanation:

Have a nice day!!!

Answer:

1/2 is 0.5 as a fraction

Answer:

1/2

Step-by-step explanation:

Not sure how this got in the middle school math section, but basically dividing 1/2 will equal 0.5.

Some other alternatives to 1/2 are

2/4, 4/8

40/80

x/2x

55/110

Answer: $58.40 Multiply 4 times 17.59 and add 237 times 0.19

Final answer:

The total cost of renting a car for 4 days at $17.59 per day and driving 237 miles at 19¢ per mile would be $115.39.

Explanation:

To calculate the cost of renting a car for 4 days:
For the rental cost, we multiply the daily rental rate by the number of days:

Rental cost=Number of days × Daily rental rate

Cost of renting the car for 4 days = 4 days x $17.59 per day = $70.36
Next, to find the cost of driving 237 miles, we multiply the distance driven by the cost per mile:

Cost of driving=Distance driven × Cost per mile

Cost of driving 237 miles at 19¢ per mile = 237 miles x $0.19 = $45.03
Total cost = Cost of renting + Cost of driving = $70.36 + $45.03 = $115.39

Answer:

x=56 and the exterior angle is 116

Step-by-step explanation:

We will call the unknown angle in the triangle y.  Angle y and the angle (2x +4) form a straight line so they make 180 degrees.

y + 2x+4 =180

Solve for y by subtracting 2x+4 from each side.

y + 2x+4 - (2x+4) =180 - (2x+4)

y = 180-2x-4

y = 176-2x

The three angles of a triangle add to 180 degrees

x+ y+ 60 = 180

x+ (176-2x)+60 = 180

Combine like terms

-x +236=180

Subtract 236 from each side

-x+236-236 = 180-236

-x = -56

Multiply each side by -1

-1*-x = -56*-1

x=56

The exterior angle is 2x+4.  Substitute x=56 into the equation.

2(56)+4

112+4

116

The area and the circumference of the circle are 28.26 square units and 18.84 units

Finding the area and the circumference of the circle

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

Radius, r = 3 units

The area and the circumference of the circle are calculated using

Area = πr²

Circumference = 2πr

Substitute the known values into the equation

Area = 3.14 * 3² =  28.26

Circumference = 2 * 3.14 * 3 = 18.84

Hence, the area and the circumference of the circle are 28.26 square units and 18.84 units

Question

The radius of a circle in 3 units

Find the area and the circumference of the circle

Answer:

The answer to your expression is 94.

Step-by-step explanation:

Given Expression -> 3 ( 7 - 5 ) + 8 ( 9 + 2 )

Order of Operations Parenthesis -> 3 ( 2 ) + 8 ( 11 )

Multiplcation Left to Right -> 6 + 8 ( 11 )

Multiplcation Left to Right -> 6 + 88

Addition -> 94

Final answer:

To evaluate the expression 3(7 - 5) + 8(9 + 2), we first solve the expressions within parentheses, then multiply, and finally add the results to get the answer, which is 94.

Explanation:

To evaluate the expression 3(7 - 5) + 8(9 + 2), we need to follow the order of operations, often remembered by the acronym PEMDAS (Parentheses, Exponents, Multiplication and Division, and Addition and Subtraction).

Then we add the results of the multiplications: 6 + 88.

So, the expression 3(7 - 5) + 8(9 + 2) evaluates to 94.