A student has passed 60 percent of the 20 quizzes he has written so far successfully. if the student writes 50 quizzes during the year, and passes 80 percent of the remaining quizzes successfully, what would his average percentile be?answer:

The solution to the equation is v = 0.

We have,

To solve the equation 7(2 + 5v) = 3v + 14, we can simplify and isolate the variable v.

Expanding the left side of the equation:

7(2 + 5v) = 14 + 35v

Now we have:

14 + 35v = 3v + 14

Next, we can combine like terms:

35v - 3v = 14 - 14

32v = 0

To solve for v, we divide both sides of the equation by 32:

v = 0/32

v = 0

Therefore,

The solution to the equation is v = 0.

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~~~~~~~~~~The answer is 366 m/min~~~~~~~~~~~~~~~~~~ First, convert the turtles speed to meters per minute. 27 km/h * 1000 m/km = 27000 m/h / 60 min/h = 450 m/min Now convert the girls speed to meters per minute. 14 dm/s / 10 dm/m * 60 s/min = 84 m/min Now subtract the girl's speed from the turtle's speed. 450 m/min = 84 m/min = 366 m/min

Area of the given Circle as the function of its diameter πd²/4

A Circle is the 2D shape which is measured in the terms of its radius.

Given that Area, radius and diameter of the given Circle is a , r and d respectively.

Area of Circle (A) = π X radius²

radius = diameter/2

Therefore replacing radius by diameter we get,

A = π(d/2)²

A = πd²/4

Hence, Area as a function of d is given by A = πd²/4

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Answer:

|v| = 10.06 units

Step-by-step explanation:

It is given that,

The x component of the vector is, [tex]v_x=7.6\ units[/tex]

The y component of the vector is, [tex]v_y=-6.6\ units[/tex]

We need to find the magnitude of vector v. The magnitude of any vector is calculated as :

[tex]|v|=\sqrt{v_x^2+v_y^2}[/tex]

[tex]|v|=\sqrt{(7.6)^2+(-6.6)^2}[/tex]

|v| = 10.06 units

So, the magnitude of vector v is 10.06 units. Hence, this is the required solution.

Answer:

Option B. 14.8 units³ is the answer.

Step-by-step explanation:

It is given in the question A solid right pyramid which has a regular hexagonal base with area = 7.4 unit²

Height of the pyramid = 6 units.

We have to calculate the volume of the pyramid.

Since volume of the pyramid = (1/3)×Area of the base × height

Volume = (1/3)×7.4×6 = 7.4 × 2 = 14.8 units³

Therefore option B. 14.8 units³ is the answer.

It should be noted that the volume of the pyramid will be 14.8 unit³.

From the information given, the solid right pyramid has a regular hexagonal base with an area of 7.4 units².

The height of the pyramid is also 6 units. Therefore, the volume of the pyramid will be:

= 1/3 × Area of the base × height

= 1/3 × 7.4 × 6

= 14.8 units³

In conclusion, the volume of the pyramid is 14.8 unit³.

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The value of b from the given equation is (c-3a)/2. Therefore, option C is the correct answer.

In mathematics, an equation is a formula that expresses the equality of two expressions, by connecting them with the equals sign =.

The given equation is 3a+2b=c.

Now, 2b=c-3a

b= (c-3a)/2

The value of b from the given equation is (c-3a)/2. Therefore, option C is the correct answer.

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The  amount of interest earned is $990 when we deposit of $5,500 at 6% for 3 years

percentage, a relative value indicating hundredth parts of any quantity.

We have to find the  amount of interest earned

The deposited amount or principal amount us 5500

Rate of interest is 6% and time is 3 years

The formula for simple interest is I=PRT

I = interest, P = principal, R = rate, T = time in years.

Let us convert 6% to decimal form

Divide 6 by 100

6%=0.06

I = 5500(0.06)(3)

I = $990

Hence, the  amount of interest earned is $990 when we deposit of $5,500 at 6% for 3 years

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The artist has cut off a total of 4 and 3/8 inches of ribbon for his project by multiplying the length of one piece (7/8 inch) by the total number of pieces cut (5).

The question involves a straightforward arithmetic operation of multiplication. Each piece of ribbon the artist cuts measures 7/8 inch, and he cuts off 5 pieces in total. To find the total length of ribbon cut off, we multiply the length of one piece (7/8 inch) by the number of pieces cut (5).

Calculation: \(\frac{7}{8} \text{ inch} \times 5 = \frac{35}{8} \text{ inches} = 4 \frac{3}{8} \text{ inches}\)

Therefore, the artist has cut off a total of 4 and 3/8 inches of ribbon for his project. This example demonstrates a practical application of multiplication in a real-world context, specifically within arts and crafts projects.

To meet their goal of saving $8,000 for their wedding, Mike and Kate need to adjust their plan. Increasing the amount they save each month by $80 (Option B) will allow them to reach their goal.

To determine which option will allow Mike and Kate to meet their goal of saving $8,000 for their wedding, we need to analyze the information given. They saved $4,000 in the first year, which means they saved $4,000 in 12 months. To reach their goal, they need to save an additional $4,000 in 8 months.

Option A: If they stay with saving the same amount they've been saving each month, they will save the same amount each month for the remaining 8 months. Therefore, they will not reach their goal of $8,000.

Option B: If they increase the amount they save each month by $80, they will be saving $80 more each month for the remaining 8 months. This will result in them saving an additional $640 ($80 x 8 months) and reaching their goal of $8,000.

Therefore, the correct answer is Option B - Only option B will allow them to meet their goal.

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Rick, Maya, and Tom worked a total of 1086 minutes.

To calculate this:

1. Convert Rick's hours to minutes: 5 hours and ½ hour = [tex]\( 5 \times 60 + 30 = 330 \) minutes.[/tex]

2. Convert Maya's hours to minutes: 6 hours and 1/10 hour = [tex]c\( 6 \times 60 + 6 = 366 \) minutes.[/tex]

3. Convert Tom's hours to minutes: 6 hours and 30 minutes = [tex]\( 6 \times 60 + 30 = 390 \) minutes.[/tex]

Now, add up all the minutes worked:

[tex]\[ 330 + 366 + 390 = 1086 \] minutes.[/tex]

Therefore, Rick, Maya, and Tom worked a total of 1086 minutes.

- Rick worked for 5 hours and ½ hour, which is 330 minutes.

- Maya worked for 6 hours and 1/10 hour, which is 366 minutes.

- Tom worked for 6 hours and 30 minutes, which is 390 minutes.

Adding these minutes together gives a total of 1086 minutes.

complete question

Rick, Maya, and Tom work in a call center. On a particular day, Rick worked 5 and ½ hours, Maya worked 6.1 hours, and Tom worked 6 hours and 30 minutes. What is the total number of minutes that they worked?

The cosine function is used to find the length of the hypotenuse of a triangle by utilizing the Pythagorean theorem.

The trigonometric function used to find the length of the hypotenuse of a triangle is the cosine function. In a right triangle, the cosine function is defined as the ratio between the length of the adjacent side to the length of the hypotenuse.

To find the length of the hypotenuse, you can use the Pythagorean theorem, which states that in a right triangle, the sum of the squares of the lengths of the two shorter sides is equal to the square of the length of the hypotenuse.

For example, if the lengths of the shorter sides are 9 blocks and 5 blocks, then the length of the hypotenuse would be √(9² + 5²) = √(81 + 25) = √106 = 10.3 blocks.

Answer:

#4) 1/2(ab); #5) 3a, 4a, 4ab, 2a

Step-by-step explanation:

#4) Take the top triangle.  The height will be the difference in the y-coordinates of J and M:

b-0 = b

The base of the triangle would be the difference in the x-coordinates of J and K:

a-0 = a

The area is given by the formula A=1/2bh, where b is the base and h is the height; substituting our height and base, we have

A=1/2(b)(a) = 1/2(ab)

#5) To find the midpoint of a section, we add together the x-coordinates and divide by to, and add together the y-coordinates and divide by 2.

The endpoints of FE are (4a, 0) and (2a, 2b).  This makes R:

[tex](\frac{2a+4a}{2},\frac{2b+0}{2})\\\\=(\frac{6a}{2},\frac{2b}{2})\\\\=(3a, b)[/tex]

The length of DF can be found by subtracting the x-coordinates:

4a-0 = 4a

The area is then found by multiplying 1/2 by the base and the height:

A=1/2(4a)(2b) = 1/2(8ab) = 4ab

The length of QR can be found by subtracting the x-coordinates:

3a-a = 2a

1st question - answer is #2

line P & Q = x=3, Y=5

 triangle question, x = 17

Answer: C. 17

Step-by-step explanation:

Given : An investment is currently worth [tex]2.125\times10^4[/tex] dollars . Ten years ago, the investment was worth [tex]1.25\times10^3[/tex] dollars.

Then, the number of times the value of the investment today is greater than the value of the investment ten years ago is given by :-

[tex]\dfrac{\text{Current investment}}{\text{\text{Yen years ago investment}}}\\\\=\dfrac{2.125\times10^4}{1.25\times10^3}\\\\=\dfrac{2.125}{1.25}\times10^{4-3}\ \ [\because a^m\times a^n=a^{m+n}]\\\\=1.7\times10=17[/tex]

Hence, the value of the investment today is 17 times greater than the value of the investment ten years ago .

Answer:  The required solution is (x, y) = (4, 6).

Step-by-step explanation:  We are given to solve the following system of equations :

[tex]x+3y=22~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~(i)\\\\2x-y=2~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~(ii)[/tex]

From equation (ii), we have

[tex]2x-y=2\\\\\Rightarrow y=2x-2~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~(iii)[/tex]

Substituting the value of y from equation (iii) in equation (i), we get

[tex]x+3(2x-2)=22\\\\\Rightarrow x+6x-6=22\\\\\Rightarrow 7x=22+6\\\\\Rightarrow 7x=28\\\\\Rightarrow x=\dfrac{28}{7}\\\\\Rightarrow x=4.[/tex]

From equation (i), we get

[tex]4+3y=22\\\\\Rightarrow 3y=22-4\\\\\Rightarrow 3y=18\\\\\Rightarrowy=\dfrac{18}{3}\\\\\Rightarrow y=6.[/tex]

Thus, the required solution is (x, y) = (4, 6).