You sell bracelets for $2 each and necklaces for $3 each at a local flea market. You collect. $95, selling a total of 37 jewelry items. How many of each type of jewelry did you sell?

Option : a is the correct answer.

            a.  rectangle.

From the figure that is provided to us we see that the cross-section is in the shape of a quadrilateral such that it has two pair of parallel sides.

b)

          circle

A circle does not have any edge or sides.

Hence, option: b is incorrect.

c)

           Trapezoid

A trapezoid is a quadrilateral with one pair of parallel sides and one pair of unparallel sides.

Hence, option: c is incorrect.

d)

             Pentagon

A pentagon is a polygon with 5 sides.

Hence, option: d is incorrect.

      Hence, the best possible answer is:

              Rectangle

Answer:

the speed of a vehicle and the time it takes the vehicle to travel 60 miles is a positive correlation

Final answer:

To find the length of FT in the similar quadrilaterals RJFT and SYPA given specific side lengths, apply the scale factor method to determine FT = 37.5 mm.

Explanation:

Quadrilateral RJFT is similar to quadrilateral SYPA. Given that JF=60 mm, AP=40 mm, and YP=25 mm, we can solve for FT.

Calculate the scale factor between the two similar quadrilaterals using side lengths: JF/AP = FT/YP.

Substitute the given values to find the length of FT.

Calculate FT = (60 mm * 25 mm) / 40 mm = 37.5 mm.

In iscosceles right triangle the value of the unknown sides is equal to [tex]3\sqrt{2}[/tex] and it can be deteremine by using pythagorean theorem.

Given :

Let the length of unknown sides be 'a'. Than to deteremine the value of a, pythagorean theorem can be used.

[tex]\rm (Hypotenuse)^2 = (Perpendicular)^2 + (Base)^2[/tex]

[tex]6^2 = a^2+a^2[/tex]

[tex]2a^2 = 36[/tex]

[tex]a^2 =\dfrac{36}{2}[/tex]

[tex]a = \sqrt{18} =3\sqrt{2}[/tex]

Therefore, by applying pythagorean theorem the value of a which is [tex]3\sqrt{2}[/tex] can be determine.

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Answer:

1. B f(x)=4sinx/2-3

2. B, F, G (c=-1. a=2, b=2)

3. c. H(t)=-2.4cos(0.017t)+12

4. A, B, E, F (y=cos^-1x, y=cot^-1x, y=sin^-1x, y=tan^-1x)

5. C y=sin^-1x

6. C 48.7

7. C f(g(x))=sec(sinx) domain: all real #

8. C step 3

Step-by-step explanation:

Answer:

Step-by-step explanation:

If m were the midline, its length would be 32/2 = 16 cm. However, there is nothing in the figure to indicate that is the case. There is not enough information to decide.

None of the options are entirely correct. The domain of the function is  [tex]\( t \geq 0 \)[/tex] , and it does not directly represent the time to complete the hill or reach maximum height.The domain is  representing all real numbers. The function doesn't directly indicate completion time or maximum height.

Let's analyze the given function  [tex]\( h(t) = -3t^2 + 15t + 18 \)[/tex] to determine the domain and its meaning:

1. **Domain of the function**:

  The domain of a quadratic function is all real numbers unless there are restrictions. In this case, there are no restrictions mentioned in the problem, so the domain is all real numbers. However, in the context of the roller coaster ride, the time ( t ) cannot be negative because it doesn't make sense for time to be negative in this scenario. Therefore, the practical domain is [tex]\( t \geq 0 \).[/tex]

2. **Time to reach maximum height**:

  The time to reach the maximum height of the roller coaster can be found using the vertex formula:  [tex]\( t = -\frac{b}{2a} \)[/tex] , where  [tex]\( a = -3 \) and \( b = 15 \)[/tex] (coefficients from the quadratic function). Substituting these values into the formula:

[tex]\[ t = -\frac{15}{2(-3)} = -\frac{15}{-6} = \frac{15}{6} = \frac{5}{2} \][/tex]

  Since time cannot be negative in this context, the time to reach the maximum height is [tex]\( t = \frac{5}{2} = 2.5 \)[/tex] seconds.

Now, let's analyze the given options:

- **Option 1: The domain of the function is [0, 6], and it represents the car's time to reach maximum height.**

 - The domain given is correct  [tex](\( t \geq 0 \)),[/tex]  but it incorrectly states that it represents the time to reach maximum height. The correct time to reach maximum height is [tex]\( t = 2.5 \)[/tex] seconds, not 6 seconds.

[tex]\( t \geq 0 \),[/tex]

- **Option 2: The domain of the function is [-1, 6], and it represents the car's time to reach maximum height.**

 - This option gives an incorrect domain. The domain is  [tex]\( t \geq 0 \), not \( t \geq -1 \).[/tex]

- **Option 3: The domain of the function is [0, 6], and it represents the car's time to complete the hill.**

 - This option correctly identifies the domain as  [tex]\( t \geq 0 \).[/tex] However, it incorrectly states that it represents the time to complete the hill. The function does not directly represent the time to complete the hill; it represents the height of the car at any given time.

- **Option 4: The domain of the function is [-1, 6], and it represents the car's time to complete the hill.**

 - This option gives an incorrect domain. The domain is [tex]\( t \geq 0 \),[/tex] not  [tex]\( t \geq -1 \).[/tex]

Therefore, none of the options are entirely correct. The domain of the function is  [tex]\( t \geq 0 \)[/tex] , and it does not directly represent the time to complete the hill or reach maximum height.

Answer:

g(x) = (x - 8)² - 64 will be the answer.

Step-by-step explanation:

The given function in the standard form is g(x) = -16x + x²

We have to write this function in the vertex form.

Since vertex form of a quadratic function is in the form of

f(x) = (x - h)² + k

Therefore, g(x) = x² - 16x may be written as

g(x) = x² - 16x + 64 - 64

      = x² - 2(8x) + 64 - 64

      = (x - 8)² - 64

Therefore, g(x) = (x - 8)² - 64 will be the answer.

Answer:

$1386.      

Step-by-step explanation:

We have been given that Zack deposited $1,200 in a savings account that paid 7.75% simple interest. We are asked to find the balance in his account at the beginning of the  third year.

The balance in the account at the beginning of the  third year will be equal to balance in the account at the end of 2nd year.

We will use simple interest formula to solve our given problem.

[tex]A=P(1+rt)[/tex], where,

A = Amount after t years,

P = Principal amount,

r = Annual interest rate in decimal form,

t = Time in years.

Upon converting our given interest rate in decimal form we will get,

[tex]7.75\%=\frac{7.75}{100}=0.0775[/tex]

Upon substituting our given values in simple interest formula we will get,

[tex]A=\$1200(1+0.0775\cdot 2)[/tex]

[tex]A=\$1200(1+0.155)[/tex]

[tex]A=\$1200(1.155)[/tex]    

[tex]A=\$1386[/tex]

Therefore, an amount of $1386 will be in Jack's account at the beginning of third year.  

The probability that mattias picks an outfit at random that includes red shoes is 0.5

Calculating the probability that mattias picks an outfit at random that includes red shoes?

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

The tree diagram

On the tree diagram, we have

Total Outfits = 12

Outfits with red = 6

So, we have the probability to be

P = Outfits with red /Total Outfits

This gives

P = 6/12

Evaluate

P = 0.5

Hence, the probability is 0.5

Question

Mattias gets dressed in the dark one morning and chooses his clothes at random. He chooses a shirt (green, red or yellow), a pair of pants (black or blue), and a pair of shoes (checkered or red).

What is the probability that mattias picks an outfit at random that includes red shoes?

Answer:

Step-by-step explanation:

X^2+3x-1 apex

Bax invested a total of $2000 in two simple interest accounts. Account A earns 3% interest and Account B earns 5% interest. Bax earned a total of $75 interest after one year. How much did Bax invest in each account?

Let, The amount invested in Account A=x

Then, the amount invested in Account B=2000-x

The formula of Simple Interest =[tex] \frac{Principle*Rate*Time}{100} [/tex]

Interest earned in Account A in 1 year=[tex] \frac{x*3*1}{100} [/tex]

Interest earned by Account A=[tex] \frac{3x}{100} [/tex]

Interest earned in Account B in 1 year=[tex] \frac{(2000-x)*5*1}{100} [/tex]

Interest earned by Account B=[tex] \frac{5(2000-x)}{100} [/tex]

Total Interest Earned= Interest earned by Account A+ Interest earned by Account B

Total Interest Earned=[tex] \frac{3x}{100} [/tex]+[tex] \frac{5(2000-x)}{100} [/tex]

75=[tex] \frac{3x}{100} [/tex]+[tex] \frac{10000-5x)}{100} [/tex]

75=[tex] \frac{3x+10000-5x)}{100} [/tex]

Multiply by 100 on both sides

75*100=[tex] \frac{100(10000-2x))}{100} [/tex]

7500=10000-2x

Let us subtract 7500 from both sides

7500-7500=10000-7500-2x

0=2500-2x

Adding 2x on both sides, we get

0+2x=2500-2x+2x

2x=2500

To solve for x, divide by 2 on both sides

2x/2=2500/2

x=1250

So, The Amount invested in Account A= $1250

The Amount invested in Account B= $2000-1250=$750

Final answer:

Dolores will make $240 by growing and selling all the cucumbers possible in her 48 square feet garden, with each cucumber selling for $2.50.

Explanation:

To calculate the amount of money Dolores will make from selling cucumbers, we need to determine how many cucumbers she can grow in her 48 square feet garden, and then multiply that number by the selling price of $2.50 per cucumber. First, we'll convert the area of her garden into square inches since we know a cucumber takes up 72 square inches of space:

48 square feet × 144 square inches per square foot = 6,912 square inches.

Next, we divide this by the amount of space needed for one cucumber to find the total number of cucumbers she can grow:

6,912 square inches ÷ 72 square inches per cucumber = 96 cucumbers.

Finally, we'll multiply the number of cucumbers by the selling price:

96 cucumbers × $2.50 per cucumber = $240.

Therefore, Dolores will make $240 by selling all the cucumbers she can grow in her garden.

The greatest Common factor of 12 and 36 is 12.

A number that divide another number is called factor.

Factors of 12 is 2, 3, 4, 6, 12

Factors of 36 are 2, 3, 4, 6, 9, 12, 18, 36.

Therefore, the greatest common factor of 12 and 36 is 12.

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Answer:

162000

Step-by-step explanation:

For 75000 paying in 30 years at 6% we have

Mortgage Summary

Monthly Payment      $449.66

Total Interest Paid  $86,879

9

Total of 360 Payments $161,879

Pay-off Date  Feb, 2049

We find out of 4 options given 162000 is nearer to this 161879

Hence option of 162000 is the right answer.

c(2) = 50 +5(2) = 60

p(2) = 80-2(2) = 76

60 * 76 = 4560 when the price is 60

We find that Grayson charges more than Ian when the number of hours of service h is less than 2.

To determine for how many hours Grayson charges more than Ian, we can set up an equation where the cost of Grayson's tax preparation service is greater than Ian's service. Grayson charges $35 per hour plus a $35 administration fee, while Ian charges $45 per hour plus a $15 administration fee. The number of hours for which the service is required is represented by h.

Grayson's total charge for h hours would be:

Grayson's Cost = $35h + $35

Ian's total charge for h hours would be:

Ian's Cost = $45h + $15

To find the number of hours where Grayson's cost is more than Ian's cost, we set Grayson's Cost > Ian's Cost:

$35h + $35 > $45h + $15

Simplifying, we get:

$35h - $45h > $15 - $35

-$10h > -$20

Dividing both sides by -10 (and remembering to reverse the inequality when dividing by a negative):

h < 2

Thus, Grayson charges more than Ian for fewer than 2 hours of tax preparation.

Final answer:

When a number in scientific notation is multiplied by 100, its exponent of 10 increases by 2 since 100 is equivalent to 10 squared (10²). For example, 3.14 x 10⁴ multiplied by 100 becomes 3.14 x 10⁶.

Explanation:

When you multiply a number in scientific notation by 100, the exponent of 10 increases by 2.

This is because 100 can be written as 10² or 10 squared.

So, if we have a number like 3.14 × 10⁴ and we multiply by 100, we are essentially multiplying by 10².

We keep the coefficient the same (3.14) and add the exponents of 10:

The resulting scientific notation is 3.14 × 10⁶, which means the exponent of 10 increased by 2 as we multiplied by 100.

Answer: Q1) 386.18

Step-by-step explanation:

Q1): You do the parenthesis first.

6(2+0.3)^5

2+0.3 = 2.3^5 = 64.36343

then do 6(64.36343) = 386.18

For Q2 I believe the answer is 0.22 if you do 7 divided by 32 you get 0.21875 and you round that to get 0.22

Answer:

D) multiply second equation by -6, solution (0,-2)

Step-by-step explanation:

This pair of linear equations may be solved simultaneously by using the elimination method. This will involve ensuring that the coefficient of one of the unknown variables is the same in both equations.

As such, in the given set of equations

12x – 3y = 6

2x – y = 2

We may make the coefficients of x the same by multiplying the second by 6 or the coefficient of y by multiplying the second by 3. Using the first

12x – 3y = 6

12x – 6y = 12

equation 1 - equation 2

3y = -6

y =  -2

2x + 2 = 2

x = 0

The rocks are at the same height approximately 1.31 seconds after Noelle drops her rock and Cesar throws his, and at this time, they are both at a height of approximately 8.57 meters.

To determine the moment when Noelle's and Cesar's rocks are at the same height, we need to set the two functions equal to each other and solve for x. Noelle's rock has the height function f(x) = -4.9x² + 17 and Cesar's rock has the height function g(x) = -4.9x² + 13x.

We solve for x when f(x) = g(x):
-4.9x² + 17 = -4.9x² + 13x
This simplifies to:
17 = 13x
Solving for x gives us:
x = 17/13
x ≈ 1.31 seconds

At approximately 1.31 seconds after Noelle drops her rock and Cesar throws his, both rocks are at the same height. To find this height, we substitute x back into either f(x) or g(x). Using Noelle's function, we get:
f(1.31) = -4.9(1.31)² + 17 ≈ 8.57 meters

Therefore, both rocks are at a height of approximately 8.57 meters 1.31 seconds after their respective releases.

Answer:

8.6

Step-by-step explanation:

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