A granite pyramid is 50 feet high and has a square base 30 feet on a side. If granite weighs 180 pounds per cubic foot, what is the weigh in tons of the pyramid?

Answers

Answer 1

The weight of the granite pyramid in tons is 1350 tons.

How to find the weight of the pyramid granite in tons?

A pyramid is a three-dimensional shape.

The granite pyramid is 50 feet high and has a square base of 30 feet on a side.

Granit weighs 180 pounds per cubic foot.

Therefore, the weight in tons of the pyramid can be calculated as follows;

Hence,

volume of the granite pyramid = 1 / 3 b² h

Therefore,

volume of the granite pyramid = 1 / 3 × 30² × 50

volume of the granite pyramid = 45000 / 3

volume of the granite pyramid = 15000 ft³

Hence,

1 ft³ = 180 pounds

15000 ft³ = ?

weight = 2700000 pounds

1 pounds = 0.0005 tons

2700000 pounds = ?

Therefore,

weight of the pyramid granite in tons = 1350 tons

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Related Questions

write the simplest polynomial equation with the given roots. -1, 2i please answer quickly

Answers

The polynomial equation with root of -1 and 2i is,

[tex]\begin{gathered} (x+1)(x+2i)(x-2i)=(x+1)(x^2-(2i)^2) \\ =(x+1)(x^2-4i^2) \\ =(x+1)(x^2+4) \\ =x^3+4x+x^2+4 \\ =x^3+x^2+4x+4 \end{gathered}[/tex]

So simplest polynomial is,

[tex]x^3+x^2+4x+4[/tex]

I’m not sure how to figure this out.What is 8% of 4000?

Answers

8% of 4000 express as;

[tex]\begin{gathered} \text{ 8\% of 4000=}\frac{8\times4000}{100} \\ \text{8\% of 4000=320} \end{gathered}[/tex]

Thus, 8% of 4000 is 320

Answer : 320

...

Parking spaces in a parking lot are parallel to each other. Find the measure of the two
unknown angles and explain your reasoning.
measure of angle m:
measure of angle n:

Answers

Answer:

m = 70° , n = 110°

Step-by-step explanation:

m and 110° are same- side interior angles and sum to 180°

m + 110° = 180° ( subtract 110° from both sides )

m = 70°

n and 110° are corresponding angles and are congruent , then

n = 110°

In an experiment, the probability that event B occurs is , and the probability that event A occurs given that event B occurs is 3 7) What is the probability that events A and B both occur? Simplify any fractions.

Answers

We have to use the conditional probability formula:

[tex]P(A|B)=\frac{P(A\cap B)}{P(B)}[/tex]

Where P(A|B) is the probability that A occurs given that B occurs, P(B) is the probability that B occurs, and P(A∩B) is the probability that both events A and B occur.

In this case, since we are asked for the probability that events A and B both occur, we need to solve the equation for P(A∩B):

[tex]P(A\cap B)=P(A|B)\cdot P(B)[/tex]

And the information we have about the problem is:

[tex]\begin{gathered} P(A|B)=\frac{3}{7} \\ P(B)=\frac{2}{9} \end{gathered}[/tex]

We substitute this into the formula for P(A∩B):

[tex]P\mleft(A\cap B\mright)=\frac{3}{7}\cdot\frac{2}{9}[/tex]

Solving the multiplication of fractions:

[tex]\begin{gathered} P\mleft(A\cap B\mright)=\frac{3\cdot2}{7\cdot9} \\ P\mleft(A\cap B\mright)=\frac{6}{63} \end{gathered}[/tex]

And finally, we simplify the fraction by dividing both numbers in the fraction by 3:

[tex]P\mleft(A\cap B\mright)=\frac{2}{21}[/tex]

Answer: 2/21

The perimeter of a triangle is 14.x - 4. If two of the sides measure 3.x - 2 and 5x + 3, then how long is the third side?

Answers

Given :

The perimeter of a triangle is, P = 14x - 4.

The sides are, a = 3x-2 and b = 5x + 3.

The perimeter of a triangle with sides a, b and c can be expressed as,

[tex]P=a+b+c[/tex]

Substituting the values, we get,

[tex]\begin{gathered} 14x-4=3x-2+5x+3-c \\ c=14x-4-(3x-2+5x+3) \\ c=6x-5 \end{gathered}[/tex]

Thus, the correct option d.

Find the lateral area and the surface area of the right cone. Round your answer to the nearest hundredth

Answers

The lateral area of a cone is the area of the lateral surface, except the base.

The surface area of a cone is the area of all its surface, which is the lateral side PLUS the base.

The lateral area is given by the formula >>>

[tex]LA=\pi rl[/tex]

The surface area is given by the formula >>>

[tex]SA=\pi r^2+\pi rl[/tex]

Given

r = 10 cm

h = 24 cm

Let's find l,

[tex]\begin{gathered} r^2+h^2=l^2 \\ 10^2+24^2=l^2 \\ l=\sqrt[]{10^2+24^2} \\ l=26 \end{gathered}[/tex]

Let's find the lateral area and the surface area >>>

Lateral Area =

[tex]\begin{gathered} LA=\pi rl \\ LA=\pi(10)(26) \\ LA=260\pi \\ LA=816.81\text{ sq. cm.} \end{gathered}[/tex]

Surface Area =

[tex]\begin{gathered} SA=\pi r^2+\pi rl \\ SA=\pi(10)^2+260\pi \\ SA=100\pi+260\pi \\ SA=360\pi \\ SA=1130.97\text{ sq. cm.} \end{gathered}[/tex]

Find the area and the circumference (or perimeter) of each of the following. (a)a penny; (b) anickel; (c) a dime; (d) a quarter, (e) a half-dollar; (f) a silver dollar; (g) a Sacajawea dollar; (h) adollar bill; and (i) one face of the pyramid on the back of a $1 bill.

Answers

You use this for the coins

Area of a circle:

[tex]A=\pi\cdot r^2[/tex]

r is the radius and it can be obtaided more easily if you measure the diameter of the circle and then divide it into 2.

Circunference or perimeter of a circle:

[tex]C=2\cdot\pi\cdot r[/tex]

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

You use this for the bills:

Aera of a rectangle:

[tex]A=l\cdot w[/tex]

Perimeter of a rectangle:

[tex]P=2l+2w[/tex]

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

The face a pyramid has the shape of a trianlge:

Area of a triangle:

[tex]A=\frac{1}{2}b\cdot h[/tex]

Perimeter of a triangle:

[tex]P=b+a+a[/tex]

Used two equations in two variables to solve the application.A 60 m pass around the rectangular garden. The width of the garden is 2/3 its length. Find the area in meters squared.

Answers

From the data provided, we can conclude:

The perimeter of the rectangle is 60m, so:

[tex]60=2w+2l_{\text{ }}(1)[/tex]

Where:

w = width

l = length

The width of the garden is 2/3 its length, therefore:

[tex]w=\frac{2}{3}l_{\text{ }}(2)[/tex]

Replace (2) into (1)

[tex]60=2(\frac{2}{3}l)+2l[/tex]

Solve for l:

[tex]\begin{gathered} 60=\frac{4}{3}l+2l \\ 60=\frac{10}{3}l \\ l=\frac{180}{10} \\ l=18 \end{gathered}[/tex]

Replace l into (2):

[tex]\begin{gathered} w=\frac{2}{3}(18) \\ w=12 \end{gathered}[/tex]

Molly was on a long 136 mile road trip. The first part of the trip there was lots of traffic, she only averaged 16 mph. The second part of the trip there was no traffic so she could drive 44 mph. If the trip took her 5 hours, how long did she travel at each speed? In traffic she drove for _____ hours After the traffic cleared she drove for ____ hours.

Answers

Answer:

In traffic, she drove for 3 hours

and After the traffic cleared she drove for 2 hours.

Explanation:

Given that the road trip was 136 miles;

[tex]d=136[/tex]

The first part of the trip there was lots of traffic, she only averaged 16 mph;

[tex]v_1=16[/tex]

The second part of the trip there was no traffic so she could drive 44 mph;

[tex]v_2=44[/tex]

She traveled for a total of 5 hours;

[tex]t=5[/tex]

let x represent the time in traffic when she traveled at 16 mph

[tex]t_1=x[/tex]

the time the traffic is clear would be;

[tex]t_2=t-t_1=5-x[/tex]

Recall that distance equals speed multiply by time;

[tex]d=v_1t_1_{}_{}^{}+v_2t_2[/tex]

substituting the values;

[tex]136=16x+44(5-x)[/tex]

solving for x;

[tex]\begin{gathered} 136=16x+220-44x \\ 44x-16x=220-136 \\ 28x=84 \\ x=\frac{84}{28} \\ x=3 \end{gathered}[/tex]

So;

[tex]\begin{gathered} t_1=3\text{ hours} \\ t_2=5-x=5-3=2 \\ t_2=2\text{ hours} \end{gathered}[/tex]

Therefore, In traffic, she drove for 3 hours

and After the traffic cleared she drove for 2 hours.

Hello could you please help me with question number five?

Answers

Question #5

Given:

The number of people who own computers has increased 23.2% annually since 1990

In 1990: the number of people who own computers = half a million

We will predict the number of people in 2015

We will use the following formula:

[tex]P(t)=P_o\cdot(1+r)^t[/tex]

Where: (r) is the ratio of increasing = 23.2% = 0.232

And (t) the number of years after 1990

And P₀ is the initial value of the number of people

P(t) will be the number of people after (t) years

To predict the number of people in 2015

t = 2015 - 1990 = 25 years

so,

[tex]\begin{gathered} P=0.5\cdot(1+0.232)^{15} \\ P=0.5\cdot1.232^{15}\approx11.43\text{ millions} \end{gathered}[/tex]

So, the answer will be:

The estimated number of people = 11.43 million

Which expression is equivalent to 4 * 4 * 4 * 5 * 5?34 x 2543 x 5244 x 501224 x 102

Answers

[tex]\begin{gathered} 4\times4\times4\times5\times5=1600 \\ 34\times25=850 \\ 43\times52=2236 \\ 44\times50=2200 \\ 1224\times102=114648 \end{gathered}[/tex]

Any of those expressions are equivalent to 4*4*4*5*5

A middle schooler is H inches tall at the beginning of the school year is the height of the middle school at the end of the year can be represented by the expression H + 0.02h, which statement is true?

Answers

Answer:

A

Step-by-step explanation:

h + 0.02h = (1+0.02)h = 1.02h

1.02h * 100% = 102%

102 - 100 = 2%

Christi earns $21 per hour working as a receptionist. If she works 19 hours per week, what is her weekly wage? A) $250 B) $299 C) $350 D) $399

Answers

Since Christi earns $21 per hour, to find how much she earns by working 19 hours per week we need to multiply the hourly wage by the number of hours she works in a week:

[tex]21\times19=399[/tex]

Her weekly wage is $399

Answer: D) $399

Joy took off from a stop light and increased her speed until she reaches the speed limit. She kept her speed steady until she saw a sign saying the speed limit has been increased. Select the graph that represents this situation.

Answers

We are presented with a group of graphs in which the x-axis represents time and the y-axis represents speed.

We are told that Joy started by accelerating when she took off, which means the graph should start with a line with positive slope.

She then maintained her speed, which means the slope of the line is 0, orin other words, the line is parallel to the time axis.

Finally, we are told that she saw a sign saying the speed limit had been increased, so she probably accelerated again, meaning the line should have a positive slope again.

Thus, the graph representing the situation is the third option.

Find the length of the third side. If necessary, round to the nearest tenth. 12 5 x=what is the missing number x?

Answers

Step 1

Longest side is the hypotanuse = x

opposite = 5

Adjacent = 12

Apply pythagorus theorem

[tex]\begin{gathered} \text{Opposite}^2+Adjacent^2=Hypotanuse^2 \\ 5^2+12^2=x^2 \\ \\ 25+144=x^2 \\ x^2\text{ = 169} \\ x\text{ = }\sqrt[\square]{169} \\ x\text{ = 13} \end{gathered}[/tex][tex]undefined[/tex]

what is polynomial define on the basis of degree and terms

Answers

Detailed Answer :-

Based on the Degree :

• A polynomial having degree 0 is called a constant polynomial.

A polynomial having degree 1 is called a linear polynomial.

A polynomial having degree 2 is called a quadratic polynomial.

A polynomial having degree 3 is called a cubic polynomial.

A polynomial having degree 4 is called a bi-quadratic polynomial.

Based on the Number of Terms :

One term - Monomial

• Two terms - Binomial

• Three terms - Trinomial

• Four terms - Quadrinomial

All of these are generally called POLYNOMIALS.

A tree on a hillside casts a shadow c = 215 ft down the hill. If the angle of inclination of the hillside is b = 23° to the horizontal and the angle of elevation of the sun is a = 53, find the height of the tree. (Round your answer to the nearest foot.)

Answers

This is the figure, roughly. We want h.

Using smaller triangle, we can write:

[tex]\begin{gathered} \text{Cos}23=\frac{x}{215} \\ x=215\cdot\cos 23 \\ x=197.9 \end{gathered}[/tex]

Also,

[tex]\begin{gathered} y=215\cdot\sin 23 \\ y=84 \end{gathered}[/tex]

Now, taking the larger triangle:

The angle is 53 (30 + 23).

Let the larger side (right side) be m, which is basically:

m = h + y

Let's find m:

[tex]\begin{gathered} \tan 53=\frac{m}{x} \\ \tan 53=\frac{m}{197.9} \\ m=197.9\cdot\tan 53 \\ m=262.62 \end{gathered}[/tex]

Now, we want height, h, which is:

m = h + y

262.62 = h + 84

h = 262.62 - 84

h = 178.62

Rounded to nearest feet

h = 179 feet

Why was math created

Answers

SOLUTION:

Step 1:

In this quesdtion, we are meant to explain the topic:

Why was Math created?"

Step 2:

The details of the solution are as follows:

1. Mathematics is a body of knowledge and knowledge and practice, that is derived from the contributions of thinkers throughout the ages and across the globe.

2. It gives us a way to understand patterns, to quantify relationships, and to predict the future.

3. Math helps us understand the world — and we use the world to understand math.

4. Excellent for your brain: Creative and analytical skills are highly desired by employers.

5. It has a lot of real-world applications.

6. It helps in better problem-solving skills.

7. Mathematics is needed in almost every career and profession.

8. Mathematics helps understand the world better.

9. Mathematics is a universal language.

10. Numbers help us understand the world, and Mathematics helps us understand numbers.

The real-life applications of Mathematics are endless.

We are surrounded by numbers, equations and algorithms – especially in this age of data science, with huge data sets that can only be understood through statistical models and analysis.

Answer:

Maths was invented to understand the world and to make measurements, do calculations etc. make and measure shapes, measure angles, and to use these things in real life. The Egyptians used the Pythagoras theorem to accurately make their pyramids.

Given a standard normal curve, find the area under the curve between z =1.40 and z =2.13.

Answers

Given:

z = 1.40 and z = 2.13

Let's find the area under the standard normal curve.

Let's find the score using the standard normal distribution table:

NORMSDIST(1.40) = 0.9192

NORMSDIST(2.13) = 0.9834

To find the area between them, we have:

P(1.40 < Z < 2.13) = P(Z<2.13) - P(Z<1.40) = 0.9834 - 0.9192 = 0.0642

Therefore, the area under the curve between z=1.40 and z=2.13 is 0.0642

ANSWER:

0.0642

determine whether or not each spaceship trip below has the same speed as Saiges spaceship

Answers

1) Since Saige's spaceship makes 588 km in 60 seconds we can find its velocity:

[tex]\begin{gathered} V=\frac{d}{t} \\ V=\frac{588}{60}=\frac{49}{5}\text{ =9.8 km /s} \\ \\ V_2=\frac{441}{45}=\frac{49}{5} \\ V_3=\frac{215}{25}=\frac{43}{5} \\ V_4=\frac{649}{110}=\frac{59}{10} \end{gathered}[/tex]

2) After simplifying we can state:

441/45 = has the same speed as Saige's spaceship

215/25 = does not have the same speed as Saige's space

649/110 =does not have the same speed as Saige's space

AB is a median of a triangle true or false

Answers

To answer this question, first we need to understand the definition of a median of a triangle.

A median of a triangle is a line segment drawn from a vertex to the midpoint of the opposite side of the vertex.

AB is a segment drawn from the vertex A, to the point B, but B is not the midpoint of the base of this triangle(the midpoint divides the segment into two equal parts, and since one part is 7 and the other is 8, B is not the midpoint

Out of 441 applicants for a job 235 have over five years of experience and 106 have over five years of experience and have a graduate degreeWhat is the probability that a randomly chosen applicant has a graduate degree given that they have a five years of experience enter a fraction or round your answer to four decimal places if necessary

Answers

Answer:

Probability that a randomly chosen applicant has a graduate degree given that they have a five years of experience = 106/441

Explanation:

Total number of applicants, n(Total) = 441

Number of candidates that have over five years of experience, n(5 yrs) = 235

Probability that a randomly chosen applicant has over 5 years experience

[tex]\begin{gathered} P(5yrs)=\frac{n(5yrs)}{n(Total)} \\ \\ P(5yrs)=\frac{235}{441} \end{gathered}[/tex]

Number of applicants that have over five years of experience and have a graduate degree, n(5 n g) = 106

Probability that a randomly selected applicant has over five years of experience and have a graduate degree

[tex]\begin{gathered} P(5\text{ n g\rparen = }\frac{n(5\text{ n g\rparen}}{n(Total)} \\ \\ P(5\text{ n g\rparen = }\frac{106}{441} \end{gathered}[/tex]

Probability that a randomly chosen applicant has a graduate degree given that they have a five years of experience

[tex]\begin{gathered} P(g\text{ /5yrs\rparen = }\frac{P(5\text{ n g\rparen}}{P(5yrs)} \\ \\ P(g\text{ /5yrs\rparen = }\frac{106}{441}÷\frac{235}{441} \\ \\ P(g\text{ /5yrs\rparen=}\frac{106}{441} \end{gathered}[/tex]

Find the volume of the given prism. Round to the nearest tenth if necessary.A.2,511.5 yd^3B.1,255.7 yd^3C.1,025.3 yd^3D.1,450.0 yd^3

Answers

Given:

The sides of an equilateral triangle base are 10 yds. The height of the prism is 29 yds.

To find:

The volume of the prism.

Solution:

The formula of the volume of the triangular prism is given by:

[tex]V=\text{ (area of base)}\times\text{ (height of the prism)}[/tex]

It is known that the area of the equilateral triangle is given by:

[tex]A=\frac{\sqrt[]{3}}{4}(side)^2[/tex]

So, the area of the base of the triangular prism is:

[tex]\begin{gathered} A=\frac{\sqrt[]{3}}{4}(10)^2 \\ =\frac{1.732}{4}\times100 \\ =\frac{173.2}{4} \\ =43.30 \end{gathered}[/tex]

Now, the volume of the given triangular prism is:

[tex]\begin{gathered} V=43.30\times29 \\ =1255.7\text{ yad\textasciicircum{}3} \end{gathered}[/tex]

The derivative of tan(ln(t)) is?

Answers

Answer: The derivative of tan(t) with respect to t is sec2(t) sec 2 ( t ) .

Step-by-step explanation:

hope this helps

i Which equation, when solved, results in a different value of x than the other three?' 7 3 4 37 X=-20 3 119-8-2014

Answers

You have the first equation:

[tex]-\frac{7}{8}x-\frac{3}{4}=20[/tex]

Let's analize the others equation.

You can see that the second equation is just like the first one, but it was multiplied by -1:

[tex]\begin{gathered} (-1)(-\frac{7}{8}x-\frac{3}{4})=(20)(-1) \\ \frac{7}{8}x+\frac{3}{4}=-20 \\ \frac{3}{4}+\frac{7}{8}x=-20 \end{gathered}[/tex]

So the value of "x" of the first one and the second one will be the same.

The third equation is:

[tex]-7(\frac{1}{8})x-\frac{3}{4}=20[/tex]

If you simplify it, you get:

[tex]-\frac{7}{8}x-\frac{3}{4}=20[/tex]

So you can notice that the three equations are the same, therefore the result of the third one will be the same too.

You can identify that even simplifying the last equation, it is not the same equation, then you will obtain a different value of "x" than the other three.

Therefore,the answer is the Last option.

On Saturday, 3 families with 4 people in each family went to a movie. Each person bought 2 snacks. Which equation can be used to find how many total snacks the families bought?

Answers

Answer:

Step-by-step explanation:3x4=12x2

One pump can empty a pool in 7 days, whereas a second pump can empty the pool in 14 days. How long will it take the two pumps, working together, to empty the pool? (Fractional answers are OK.)The first pump's rate is_____per day.The second pump's rate is____per day.The combined pumps rate is____per day.It will take the two pumps_____per day.

Answers

The first step is to define the daily rates of each pump

From the information given,

First pump can empty the pool in 7 days. This means that

Daily rate of first pump = 1/7

The first pump's rate is 1/7 per day

Second pump can empty the pool in 14 days. This means that

Daily rate of second pump = 1/14

The second pump's rate is 1/14 per day

Let t be the number of days it will take both pumps, working together to empty the pool. Thus,

combined daily rate of both pumps = 1/t

The rates are additive. It means that

1/7 + 1/14 = 1/t

Simplifying the left side, we have

3/14 = 1/t

The combined pumps rate is 3/14 per day

By taking reciprocal of both sides,

t = 14/3 = 4.67

It will take the two pumps 4.67 days to empty the pool together

You are looking for summer work to help pay for college expenses. Your neighbor is interested in hiring you to do yard work and other odd jobs. You tell them that you can start right away and will work all day July 1 for 3 cents. This gets your neighbor's attention, but they is wondering if there is a catch. You tell them that you will work July 2 for 9 cents, July 3 for 27 cents, July 4 for 81 cents, and so on for every day in the month of July. Which equation will help you determine how much money you will make in July?

Answers

Answer:

y=3^x

Explanation:

The expected payments (in cents) beginning from July 1 are given below:

[tex]3,9,27,81,\cdots[/tex]

Observing the payments for each subsequent day, we see that the payment for the previous day was multiplied by 3.

We can rewrite the payment as a power of 3 as follows:

[tex]3^1,3^2,3^3,3^4,\cdots[/tex]

Therefore, the equation will help you determine how much money you will make in July will be:

[tex]y=3^x[/tex]

The first option is correct.

A bank offers a CD that pays a simple interest rate of 8.0%. How much must you put in this CD now in order to have $2500 for a home-entertainment center in 3 years.

Answers

Okay, here we have this:

Considering that the formula for the simple interest rate is:

A = P (1 + rt)

In this case A is equal to $2500, P is the value we need to find, r is the interest rate (in decimal) 0.08, and t is the time, so it's 3 years, replacing we obtain:

2500=P(1+0.08*3)

Now, let's clear P:

2500=P(1+0.24)

2500=P(1.24)

2500/1.24=P

P=2016.13

Finally we obtain that the bank must put $ 2016.13 on a CD to get $ 2,500 in three years.

2. When is it important to use a strict inequality vs a non-strict inequality?

Answers

A strict inequality is one which involves the use of

[tex]>\text{, }<\text{ or }\ne[/tex]

A non-strict inequality is one which involves the use of

[tex]\ge\text{ or }\leq[/tex]

A strict inequality is used in a case when the two values being compared or related to one another cannot be equal to one another. That is, they are different.

A non-strict inequality is used in case when there is a possibility that the two values being compared can be equal to one another.

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Please help! i would be able to learn the answer if i took some time but pls just help me so i don't have to. simplify: 4 1/5 + 3 2/3 + 1 1/6. a: 8 11/30. b: 7 13/15. c: 9 1/30. or d: 9 1/5 Consider the following program segment://include statement(s)//using namespace statementint main(){ //variable declaration //executable statements //return statement}Write C++ statements that include the header files iostream and string.Write a C++ statement that allows you to use cin, cout, and endl without the prefix std::.Write C++ statements that declare and initialize the following named constants: SECRET of type int initialized to 11 and RATE of type double initialized to 12.50.Write C++ statements that declare the following variables: num1, num2, and newNum of type int; name of type string; and hoursWorked and wages of type double.Write C++ statements that prompt the user to input two integers and store the first number in num1 and the second number in num2.Write a C++ statement(s) that outputs the values of num1 and num2, indicating which is num1 and which is num2. For example, if num1 is 8 and num2 is 5, then the output is:The value of num1 = 8 and the value of num2 = 5.Write a C++ statement that multiplies the value of num1 by 2, adds the value of num2 to it, and then stores the result in newNum. Then, write a C++ statement that outputs the value of newNum.Write a C++ statement that updates the value of newNum by adding the value of the named constant SECRET to it. Then, write a C++ statement that outputs the value of newNum with an appropriate message.Write C++ statements that prompt the user to enter a persons last name and then store the last name into the variable name.Write C++ statements that prompt the user to enter a decimal number between 0 and 70 and then store the number entered into hoursWorked.Write a C++ statement that multiplies the value of the named constant RATE with the value of hoursWorked and then stores the result into the variable wages.Write C++ statements that produce the following output:Name: //output the vlaue of the variable namePay Rate: $ //output the value of the RateHours Worked: //output the value of the variable hoursWorkedSalary: $ //output the value of the variable wagesFor example, if the value of name is "Rainbow" and hoursWorked is 45.50, then the output is:Name: RainbowPay Rate: $12.50Hours Worked: 45.50Salary: $568.75Write a C++ program that tests each of the C++ statements that you wrote in parts a through l. Place the statements at the appropriate place in the C++ program segment given at the beginning of this problem. Test run your program (twice) on the following input data:a.num1 = 13, num2 = 28; name ="Jacobson"; hoursWorked = 48.30.b.num1 = 32, num2 = 15; name ="Crawford"; hoursWorked = 58.45. PLEASE SOMEONE HELP EXPLAIN THIS ITS DUE FIRST THING TMRW MORNING!! Determine the empirical formula of a 28.00 gram sample containing 22.90 grams carbon and 5.10 grams hydrogen. A volleyball drops 8 meters and bounces up 2 meters.Use the expression |-8 + 2 to find the total distancethe volleyball travels. The total distance the volleyball travels ismeters. What is this sign of 30 angle and the sign of the 60 angle help w Spanish one pls 3. At which of the following angles is the tangent function undefined?(1) 0 =180(3) 0 = 45(4) 0 =-360(2) 0=-90 A fuzzy die that has a weight of 1.70N hangs from the ceiling of a car by a massless string. The car travels on a horizontal road and has an acceleration of 2.70m/s^2 to the left. The string makes an angle theta with respect to the vertical, as shown in the figure below. 1) What is the angle theta? Given the following table of values determine the value of X where f(x) has a local minimum. Assume that f is continuous and differentiable for all reals When copper is heated with an excess of sulfur, copper(I) sulfide is formed.In a given experiment, 1.53 g of copper was heated with excess sulfur to yield 1.76 g of copper(I) sulfide.What is the percent yield? Which of the following sentences contains a comma splice? Heather loves traveling with her best friends Robin and Brett, they have seen their favorite band at least 15 times together. Heather loves traveling with her best friends Robin and Brett; they have seen their favorite band at least 15 times together. Heather loves traveling with her best friends Robin and Brett: they have seen their favorite band at least 15 times together. Heather loves traveling with her best friends, Robin and Brett. They have seen their favorite band at least 15 times together.