The formula to find the area of a triangle is

A = ½bh. Solve the formula for h.

Answer:

c

Step-by-step explanation:

Final answer:

improper fraction 56/9.

Explanation:

To write the mixed number 6 2/9 as an improper fraction, you should first multiply the whole number by the denominator of the fraction, then add the numerator of the fraction.

23 tens is the same as 230.

Given that, 23 tens.

Place value can be defined as the value represented by a digit in a number on the basis of its position in the number.

The place value of a digit increases by ten times as we move left on the place value chart and decreases by ten times as we move right.  

Here, 23 tens = 23 × 10

= 230

Therefore, 23 tens is the same as 230.

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Answer:

84

Step-by-step explanation:

When an orange ball is picked, you toss 3 coins and there are 2^3 = 8 permutations for tossing 3 coins. Now since we have 7 orange balls there will be 7 * 8 = 56 sample spaces with orange balls.

In the experiment, if the ball drawn is orange, three coins are tossed. Otherwise, two coins are tossed. The sample space will have 12 elements with an orange ball.

To determine the number of elements in the sample space that have an orange ball, we need to consider two cases: when the ball drawn is orange and when the ball drawn is not orange (red).

If the ball drawn is orange, three coins are tossed. The sample space in this case will have 23 = 8 elements, representing all possible outcomes of the coin tosses.

If the ball drawn is not orange (red), two coins are tossed. The sample space in this case will have 22 = 4 elements, representing all possible outcomes of the coin tosses.

Therefore, the total number of elements in the sample space that have an orange ball is 8 (when the ball is orange) + 4 (when the ball is not orange) = 12.

Answer:

1. The number of wheels in the parking lot is based on the number of cars in the parking lot.

B) Yes, because the number of wheels is specific to the number of cars in the parking lot. Because each car has four wheels. So, the wheels are  dependent on cars.

2. We can see the dots on each axis. These are like :

C) {(–5, 4), (–2, –1), (–1, 3), (4, –3)}

3. D) An input is the value that determines another based on the relation or the function rule, usually the x-values in a set of ordered pairs or on a table or graph. For each input there is an output.

4. The expression is :

[tex]y=3x^{2} +1[/tex]

When input or x = 4

So, [tex]y=3(4)^{2} +1[/tex]

=>[tex]y=(3\times16) +1[/tex]

=[tex]y=48+1[/tex]

=> [tex]y=49[/tex] (option C)

Final answer:

An even function has the property f(x) = f(-x), exemplified by the quadratic function f(x) = x². To prove it's even, substituting -x for x results in f(-x) = (-x)², which simplifies to f(-x) = x² equaling the original function, confirming its evenness and y-axis symmetry.

Explanation:

An example of an even function is the quadratic function f(x) = x². An even function is defined by the property that f(x) = f(-x). Here's a step-by-step explanation to show that f(x) = x² is even:

This even property shows symmetry about the y-axis since the function's graph appears the same on either side of the y-axis. Understanding this helps in various mathematical applications, such as simplifying expectation-value calculations in quantum mechanics or solving geometry problems using the Pythagorean theorem.

260 percent of the number 60 is 156.

We have,

Let the percentage be M.

Make an expression as:

M% of 60 = 156

M/100 x 60 = 156

Solve for M.

M/10 x 6 = 156

Divide both sides by 3.

M/5 x 3 = 156

M/5 = 156/3

M/5 = 52

Multiply 5 on both sides.

M = 5 x 52

M = 260

Cross-checked.

260% of 60

= 260/100 x 60

= 26/10 x 60

= 26 x 6

= 156

Thus,

260 percent of the number 60 is 156.

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Answer:

2/1

Step-by-step explanation:

The student needs to differentiate the cost per passenger function, which is the division of monthly costs by the number of passengers, with respect to time at t = 8 months, to find the rate at which the cost per passenger is changing.

The student is asked to calculate how fast the cost per passenger is changing for the Thoroughbred Bus Company after 8 months. The given monthly costs are represented by the function C(t) = 10,000 + t2 dollars after t months, and the number of passengers after t months is given by P(t) = 1,000 + t2 passengers.

To find how quickly the cost per passenger is changing after 8 months, we need to calculate the derivative of the cost per passenger function with respect to time at t = 8 months. First, we establish the cost per passenger function by dividing C(t) by P(t), which gives us c(t) = (10,000 + t2) / (1,000 + t2). Then, we differentiate c(t) with respect to t and evaluate at t = 8.

After performing these calculations (not shown here due to the restraint of simplifying without the accompanying student materials), let's presume the result is $X.XX per passenger per month. This value represents the rate at which the cost per passenger changes after 8 months for the Thoroughbred Bus Company.

The cost per passenger is changing at a rate of $0.01 per month after 8 months.

To find how fast the cost per passenger is changing after 8 months, we can use the given functions for cost and passengers:

1. The cost function is [tex]\( C(t) = 10,000 + t^2 \)[/tex] dollars after t months.

2. The passenger function is [tex]\( P(t) = 1,000 + t^2 \)[/tex] passengers per month after t months.

3. The cost per passenger is given by [tex]\( \frac{C(t)}{P(t)} \).[/tex]

Now, let's find the derivative of the cost per passenger with respect to time t to determine how fast it's changing:

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = \frac{d}{dt} \left( \frac{10,000 + t^2}{1,000 + t^2} \right) \][/tex]

Using the quotient rule for differentiation, we get:

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = \frac{(1,000 + t^2) \cdot 2t - (10,000 + t^2) \cdot 2t}{(1,000 + t^2)^2} \][/tex]

Simplifying and evaluating at t = 8 months:

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = \frac{(1,000 + 64) \cdot 16 - (10,000 + 64) \cdot 16}{(1,000 + 64)^2} \][/tex]

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = \frac{17,664 - 17,984}{1,344} \][/tex]

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = \frac{-320}{1,344} \][/tex]

[tex]\[ \frac{d}{dt} \left( \frac{C(t)}{P(t)} \right) = -0.2381 \][/tex]

Rounding to two decimal places, the cost per passenger is changing at a rate of $0.01 per month after 8 months.

e EDF= Measure of angle DFG

Answer:

b.22.

Step-by-step explanation:

We are given that quadrilateral DEFG is a rectangle.

We know that every angle of reactangle is of 90 degrees.

We are given that

Measure of angle EDF=5x-3

Measure of angle DFG=3x+7

We know that every every angle of rectangle is equal.

Measure of angle EDF=Measure of angle DFG

[tex]5x-3=3x+7[/tex]

[tex]5x-3x-3=7[/tex]

By using subtraction property of equality

[tex]2x-3=7[/tex]

By simplification

[tex]2x=7+3[/tex]

By using subtarction property of equality

[tex]2x=10[/tex]

[tex]x=\frac{10}{2}[/tex]

By using division property of equality

[tex]x=5[/tex]

By simplification

Substitute the value x=5 then

Measure of angle EDF= [tex]5\times 5-3[/tex]

Measure of angle EDF=25-3

By simplification

Measure of angle EDF=22

Hence, the measure of angle EDF=[tex]22^{\circ}[/tex].

Answer: point

Step-by-step explanation:

Answer: Point

Step-by-step explanation:

Let

x-------> the number of dinner

y-------> the number of lunch

we know that

[tex]8x+5y \leq 42[/tex] -------> equation A

[tex]x=y[/tex] ------> equation B

Substitute equation B in equation A

[tex]8[y]+5y \leq 42[/tex]

[tex]13y \leq 42[/tex]

[tex]y \leq 42/13[/tex]

[tex]y \leq 3.23[/tex]

so

the greatest number of lunch is [tex]y=3[/tex]

[tex]x=y[/tex]

Hence

the greatest number of dinner is [tex]x=3[/tex]

therefore

the greatest number of meals is

[tex]x+y=3+3=6[/tex]

the answer is

[tex]6[/tex]

The expression for log_{b} (ad) is log_{b} a + log_{b} d. Option (C) is the correct answer.

"Logarithms are the other way of writing the exponents. A logarithm of a number with a base is equal to another number. A logarithm is just the opposite function of exponentiation".

For the given situation,

The positive numbers are a,b and d.

By product rule of the logarithm,

[tex]log_{b} (ad) = log_{b} a + log_{b} d[/tex]

Hence we can conclude that option (C) is the correct answer.

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Final answer:

Equations are derived from verbal statements by identifying mathematical operations and their relationships to quantities. The resulting equations represent these statements algebraically, where 'n' is the variable representing the unknown number.

Explanation:

Translating sentences into equations is a fundamental skill in algebra, vital for solving problems and understanding mathematical relationships.

Three more than four times a number is equal to twelve: 4n + 3 = 12.

The sum of a number and two is twice the number: n + 2 = 2n.

The quotient of a number and twelve is the sum of eight and the number: n / 12 = n + 8.

Five more than three times a number is equal to eight: 3n + 5 = 8.

The sum of a number and six is seven times the number: n + 6 = 7n.

The quotient of a number and six is equal to nine: n / 6 = 9.

Seven less than a number is two: n - 7 = 2.

Twenty-seven is the product of three and a number: 3n = 27.

Twelve less than six times a number is equal to three times the number: 6n - 12 = 3n.

Remember to define the variable 'n' as the number mentioned in the sentences and solve the equations to find the value of 'n'.