A total of 304 tickets were sold for the school play. They were either adult or student tickets. The number of student tickets were sold was three times the number of the adult tickets sold. How many adult tickets were sold?

Using the concept of combinations, the person can order a two course meal in 63 ways

To determine the number of ways a person can order a two-course meal from the given options of appetizers and main courses, we can use the concept of combinations.

In this case, we need to choose one appetizer and one main course. Since these choices are independent, we can use the principle of multiplication.

The number of ways to choose one appetizer from 7 options is 7, and the number of ways to choose one main course from 9 options is 9.

Therefore, the total number of ways to order a two-course meal is given by the product of these two choices:

Number of ways = 7 * 9 = 63.

Hence, a person can order a two-course meal in 63 different ways from the given options of appetizers and main courses.

Learn more on combinations here;

https://brainly.com/question/28065038

#SPJ2

Step 1

Find the equation of the line perpendicular to [tex] y = 4x + 5 [/tex] that pas through the origin

we know that

the slope of the equation [tex] y = 4x + 5 [/tex] is

[tex] m1=4 [/tex]

if two lines are perpendicular

then

the product of their slopes is equal to [tex] -1 [/tex]

[tex] m1*m2=-1 [/tex]

the slope of the line perpendicular is equal to

[tex] m2=-\frac{1}{m1} \\\\ m2=-\frac{1}{4} [/tex]

with m2 and the origin find the equation of the line

[tex] y-y1=m(x-x1)\\ y-0=(-\frac{1}{4} )*(x-0)\\ y=-\frac{1}{4} x [/tex]

Step 2

Solve the system

[tex] y = 4x + 5 [/tex]---> equation [tex] 1 [/tex]

[tex] y=-\frac{1}{4} x [/tex]-----> equation [tex] 2 [/tex]

Multiply equation [tex] 1 [/tex] by [tex] -1 [/tex]

Adds equation [tex] 1 [/tex] and equation [tex] 2 [/tex]

[tex] -y = -4x - 5 [/tex]

[tex] y=-\frac{1}{4} x \\ ----- [/tex]

[tex] 0=-4x-\frac{1}{4} x-5\\ \\ \frac{17}{4} x=-5\\ \\ x=-\frac{20}{17} [/tex]

[tex] y = 4x + 5 [/tex]

[tex] y = 4*(-\frac{20}{17}) + 5 \\ \\ y=\frac{5}{17} [/tex]

the solution is the point [tex] (-\frac{20}{17} ,\frac{5}{17} ) [/tex]

[tex] (-\frac{20}{17} ,\frac{5}{17} ) [/tex]=[tex] (-1.176 ,0.294 ) [/tex]

therefore

the answer is

the point is [tex] (-\frac{20}{17} ,\frac{5}{17} ) [/tex]

see the attached figure

The point [tex]\boxed{(-1.176,0.294)}[/tex] on the line [tex]y=4x+5[/tex] is the closest point to the origin.  

Further explanation:

The general form of linear function is as follows:

[tex]\boxed{y=mx+c}[/tex]

A linear function has one independent variable and one dependent variable. The independent variable is [tex]x[/tex] and the dependent variable is [tex]y[/tex].

Here, [tex]c[/tex] is the constant term and [tex]m[/tex] is the slope and gives the rate of change of dependent variable.  

The point slope form of a line is given as follows:

[tex]\boxed{y-y_{1}=m(x-x_{1})}[/tex]  

where [tex](x_{1},y_{1})[/tex] is the point on the line and [tex]m[/tex] is the slope of the line.

It is given that the equation of the line is as follows:

[tex]y=4x+5[/tex]

where [tex]4[/tex] is the slope of the line.

Consider the slope of the line [tex]y=4x+5[/tex] as [tex]m_{1}=4[/tex].

We first find the line perpendicular to the line [tex]y=4x+5[/tex] that passes through the origin as shown in Figure 1 in the attachment below.

If two lines are perpendicular then the product of their slopes is [tex]-1[/tex]  that is [tex]m_{1}\tiimes m_{2}=-1[/tex].

And [tex]m_{2}[/tex] is the slope of the perpendicular line.

Calculated the value of [tex]m_{2}[/tex] as follows:

[tex]\begin{aligned}m_{1}\times m_{2}&=-1\\m_{2}&=-\dfrac{-1}{m_{1}}\\&=\dfrac{-1}{4}\\&=-0.25\end{aligned}[/tex]

Therefore, the slope of perpendicular line is [tex]-0.25[/tex].

We have the point [tex](0,0)[/tex] on the line and the slope of the line.

Thus, the equation of line is,

[tex]\begin{aligned}y-y_{1}&=m_{2}(x-x_{1})\\y-0&=(-0.25)(x-0)\\y&=-0.25x\end{aligned}[/tex]  

The equation of the perpendicular line is as follows:

[tex]\boxed{y=-0.25x}[/tex]        .......(2)

Substitute [tex]y=-0.25x[/tex] in equation (1).

[tex]\begin{aligned}-\dfrac{x}{4}&=4x+5\\-\dfrac{x}{4}-4x&=5\\-\dfrac{17x}{4}&=5\\-17x&=5\times 4\\x&=-\dfrac{20}{17}\\x&\approx-1.176\end{aligned}[/tex]  

Now, put the value of [tex]x[/tex] in equation (2) to get the value of [tex]y[/tex] as,

[tex]\begin{aligned}y&=-0.25\times (-1.176)\\&=0.294\end{aligned}[/tex]  

Therefore, the closest point is [tex]\boxed{(-1.176,0.294)}[/tex].

Learn more

1. A Problem on the slope-intercept form https://brainly.com/question/1473992.

2. A Problem on the center and radius of an equation https://brainly.com/question/9510228

3. A Problem on general form of the equation of the circle https://brainly.com/question/1506955

Answer details:

Grade: High school

Subject: Mathematics

Chapter: Linear equations

Keywords: Linear equations, slope of a line, equation of the line, function, real numbers, ordinates, abscissa, interval, open interval, closed intervals, semi-closed intervals, semi-open intervals, sets, range domain, codomain.

Where the above figure is given as the attendant derivatives F', the maximum value attained by F is 400.

It is to be noted that:

Max occurs at x=50 where F'(x) = 0.

We need to find value for F(50) using fundamental theorem of calculus:

[tex]\int_{50}^{50} F' dx = F(50) - F(20)[/tex]

= F (50) -100
F(50) = 100 + A

Where A is the estimated Area under the graph.

If we assume the shaded region is close to a right triangle then the Area is

(1/2) x 30 x 20

= 300

Thus,

F (50) = 100 + 300

= 400

Learn more about derivatives at:

https://brainly.com/question/28376218

#SPJ3

The annual depreciation expense for the meat processor's refrigerator, using the straight-line method, is $2,600.

Straight-line Depreciation Calculation

The straight-line depreciation method spreads the cost of an asset evenly over its useful life. To calculate the annual depreciation expense for the refrigerator, we follow this formula: (Cost of the asset - Residual value) / Estimated useful life.

In this case, the numbers provided are a cost of $48,000, a residual value of $9,000, and an estimated useful life of 15 years. Using these values, the calculation is as follows:

(48,000 - 9,000) / 15 = 39,000 / 15 = $2,600 per year.

Therefore, the annual depreciation expense that the meat processor would record for this refrigerator is $2,600.

Using the probability concept, it is found that there is a 0.1538 = 15.38% probability of drawing a 5 or a queen.

A probability is the number of desired outcomes divided by the number of total outcomes, hence:

[tex]p = \frac{D}{T}[/tex]

In this problem:

The probability is:

[tex]p = \frac{D}{T} = \frac{8}{52} = 0.1538[/tex]

0.1538 = 15.38% probability of drawing a 5 or a queen.

A similar problem is given at https://brainly.com/question/24437717

The area of each strip of paper is 15/8 square inches.

The area of each strip of paper can be calculated by multiplying the length and width of the strip. In this case, the length is 2 1/2 inches and the width is 3/4 inches. To multiply fractions, multiply the numerators together to get the numerator of the product, and multiply the denominators together to get the denominator of the product. So, the area of each strip is:

(2 1/2 inches) x (3/4 inches) = (5/2 inches) x (3/4 inches) = 15/8 square inches.

Amount earn as commission on real state building is $5,520

What information do we have?

Amount of real state house = $92,000

Percentage of Commission on sale = 6%

Amount earn as commission = Amount of real state house × Percentage of Commission on sale

Amount earn as commission = 92,000 × 6%

Amount earn as commission = 92,000 × 0.06

Amount earn as commission = $5,520

Find out more information about 'Commission'.

https://brainly.com/question/929522?referrer=searchResults

In the given scenario, 10 empty bottles are equivalent to one drink. So, with 100 bottles, you'd be able to exchange for 10 drinks.

Explanation:

The subject is mathematics, specifically a problem relating to division. The scenario describes a situation where 10 empty bottles can be exchanged for a single drink. If you have 100 bottles, you will be able to exchange these for drinks. To figure out how many drinks you would get, divide the total number of bottles by the number of bottles needed for one drink. So, 100 bottles divided by 10 bottles per drink equals 10 drinks.

Learn more about division here:

https://brainly.com/question/2273245

#SPJ12

Final answer:

After examining possible combinations of the given numbers (72, 21, 15, 36, 69, 81, 9, 27, 42, and 63), we find no subset that adds up to exactly 100. The closest sum we can get is 99, which is not sufficient to win the prize. Hence, we will not win the $100.

Explanation:

To determine whether we will win the $100 by finding a combination of the given numbers that add up to 100, we should examine possible combinations. The provided numbers are 72, 21, 15, 36, 69, 81, 9, 27, 42, and 63.

Looking at these numbers, we can see if any subsets add to 100:

It becomes evident that combinations of the given numbers will either fall short of or exceed 100. The closest combinations we can make are 99, just one short of the required total, meaning we cannot win the $100 with the provided numbers on the card. Therefore, the answer is no; we will not win $100 as we cannot make a sum of exactly 100 using the numbers on the card.

The probability that a couple will have a girl a boy a girl and a boy in this specific order is 1/16

Probability is the likelihood or chance that an event will occur.

Probability = Expected outcome/Total outcome

If the couple will give birth to a boy and a girl, hence the total outcome of the event is 2

Pr(having a boy) = 1/2

Pr(having a girl) = 1/2

Pr(a girl, a boy, a girl and a boy) = 1/2 * 1/2 *1/2 * 1/2

Pr(a girl, a boy, a girl, and a boy) = 1/16

Hence the probability that a couple will have a girl a boy a girl and a boy in this specific order is 1/16

Learn more probability here: https://brainly.com/question/13604758

The explicit formula for the value of the truck after [tex]\(n\)[/tex] years is:

[tex]\[V(n) = -2,500n + 32,000\][/tex]

Where [tex]\(V(n)\)[/tex] represents the value of the truck after [tex]\(n\)[/tex] years.

To write an explicit formula for the value of the truck after n years with linear depreciation, we can use the formula for the equation of a straight line:

[tex]\[y = mx + b\][/tex]

Where:

- [tex]\(y\)[/tex] is the value of the truck after [tex]\(n\)[/tex] years.

- [tex]\(m\)[/tex] is the slope of the line, which represents the rate of depreciation per year.

- [tex]\(x\)[/tex] is the number of years.

-[tex]\(b\)[/tex] is the initial value of the truck.

Given:

- Initial value [tex](\(b\)): $32,000[/tex]

- Value after 3 years [tex](\(y\)): $24,500[/tex]

We can use these values to find the slope [tex](\(m\))[/tex]:

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

Substituting the given values:

[tex]\[m = \frac{24,500 - 32,000}{3 - 0}\]\[m = \frac{-7,500}{3}\]\[m = -2,500\][/tex]

Now, we have [tex]\(m = -2,500\)[/tex]. We can substitute this slope and the initial value into the equation:

[tex]\[y = -2,500x + 32,000\][/tex]

The explicit formula for the value of the truck after [tex]\(n\)[/tex] years is:

[tex]\[V(n) = -2,500n + 32,000\][/tex]

Where [tex]\(V(n)\)[/tex] represents the value of the truck after [tex]\(n\)[/tex] years.

The mean thickness of the washers is 1.55 mm and the standard deviation is approximately 0.296 mm.

To find the mean of the thicknesses, we add up all the values and divide it by the total number of values. In this case, the sum of the thicknesses is 24.81. Dividing this by the total number of values, which is 16, gives us a mean of 1.55 mm.

To find the standard deviation, we need to calculate the variance first. The formula for variance is sum of (value - mean)^2 divided by n - 1, where n is the number of values. After calculating the variance, we take its square root to find the standard deviation. In this case, the variance is 0.0877, and the standard deviation is approximately 0.296 mm.