Yana is using an indirect method to prove that segment DE is not parallel to segment BC in the triangle ABC shown below: A triangle ABC is shown. D is a point on side AB and E is a point on side AC. Points D and E are joined using a straight line. The length of AD is equal to 4, the length of DB is equal to 5, the length of AE is equal to 6 and the length of EC is equal to 7. She starts with the assumption that segment DE is parallel to segment BC. Which inequality will she use to contradict the assumption? 4:9 ≠ 6:13 4:9 ≠ 6:7 4:13 ≠ 6:9 4:5 ≠ 6:13

Answer: Second option : (5, −2)

Step-by-step explanation: Given system of inequalities

y ≤ x − 5

y ≥ −x − 4

Plugging x=5 and y=-2 in first inequality

-2  ≤ 5 − 5

-2 ≤  0 : True.

Plugging x=5 and y=-2 in second inequality

-2 ≥ −5 − 4

-2 ≥ -9 : Also true.

Point  (5, −2) satisfied both of the given inequalities in the system.

Therefore, (5,-2) is correct option.

Answer:  Third option is correct.

Step-by-step explanation:

Since we have given that

[tex]\sqrt{2x+4}=16[/tex]

We need to find the value of 'x'.

First we squaring the both sides:

[tex](\sqrt{2x+4})^2=16^2\\\\2x+4=256\\\\2x=256-4\\\\2x=252\\\\x=\dfrac{252}{2}\\\\x=126[/tex]

Hence, the value of x is 126.

Therefore, Third option is correct.

Answer:

C on Edge

Step-by-step explanation:

Received a 100% on the quiz.

x / |4/7| = 28

Multiply by |4/7|

x = |4/7| x 28

Ignore the absolute for a second and note 4/7 x 28 is 16 because...
28 / 7 = 4
4 x 4 = 16

x = |16|

A drawer contains five pairs of socks that are brown, black, white, red, and blue. Claude takes the red socks out of the drawer. What is the probability of Claude choosing the red socks on his first pick?

Answer: 1/25

Answer:

The answer would be 1/25 Hopefully this any T4L students!

The appropriate range for John's distance in miles (d) during the marathon is A. [tex]$0 \leq d \leq 26.2$[/tex].

In a marathon, the distance (d) John covers depends on the time (t) he spends running. The distance is fixed at 26.2 miles, so we need to find the appropriate range for the time (t) he spends running.

Let's calculate John's average speed (v) during the marathon. We know that speed is given by:

[tex]\[ v = \frac{d}{t} \][/tex]

Where:

- v = average speed (miles per hour)

- d = distance covered (miles)

- t = time spent running (hours)

Given that John's distance is 26.2 miles, and the marathon covers this distance, we have:

[tex]\[ 26.2 = \frac{26.2}{t} \][/tex]

Solving for t:

[tex]\[ t = \frac{26.2}{26.2} = 1 \][/tex]

So, John takes 1 hour to cover the 26.2 miles.

Now, let's consider the maximum and minimum possible times for John to complete the marathon:

- Minimum time: John completes the marathon in the fastest time possible. Let's say this is 0. This implies he runs the marathon in 0 hours.

- Maximum time: John takes his time and completes the marathon at the slowest pace possible. Let's use the average time for a marathon, which is around 4.5 hours.

Thus, the appropriate range for the time (t) is:

[tex]\[ 0 \leq t \leq 4.5 \][/tex]

This corresponds to option C: [tex]$0 \leq t \leq 4.5$[/tex].

Complete Question:
John is participating in a marathon that is 26.2 miles. His distance (d, in miles) depends on his time (t, in hours) Which is an appropriate range for this situation?

A. [tex]$0 \leq d \leq 26.2$[/tex]

B. [tex]$0 \leq d \leq 4.5$[/tex]

c. [tex]$0 \leq t \leq 4.5$[/tex]

D. [tex]$0 \leq t \leq 26.2$[/tex]

Answer:

Plan B is correct answer.

Step-by-step explanation:

Raise the price by 10 percent each week until the price reaches $8.00.

Week 1. Starting price $5

[tex]0.1\times5=0.5[/tex]

price becomes = [tex]5+0.5=5.5[/tex]

Week 2.

[tex]0.1\times5.5=0.55[/tex]

Price becomes = [tex]5.5+0.55=6.05[/tex]

Week 3.

[tex]0.1\times6.05=0.605[/tex]

Price become = [tex]6.05+0.605=6.655[/tex]

Week 4.

[tex]0.1\times6.655=0.6655[/tex]

Price becomes = [tex]6.655+0.6655=7.320[/tex]

Week 5.

[tex]0.1\times7.320=0.732[/tex]

Price becomes = [tex]7.320+0.732=8.052[/tex]

So, we can see that in 5 weeks the price becomes $8 from $5. Therefore, plan B is the best plan.

The product of the functions[tex]\( f(x) = x^2 + 4x - 1 \) and \( g(x) = 5x - 7 \) is \( 5x^3 + 13x^2 - 33x + 7 \).[/tex]

The correct answer is indeed [tex]{C} \),[/tex] which matches [tex]\( 5x^3 + 13x^2 - 33x + 7 \).[/tex]

To find the product[tex]\( (f \cdot g)(x) \)[/tex], where [tex]\( f(x) = x^2 + 4x - 1 \)[/tex] and [tex]\( g(x) = 5x - 7 \),[/tex]we need to perform the multiplication of these two functions.

Start by expanding [tex]\( f(x) \cdot g(x) \):[/tex]

1. Write down ( f(x) ):

[tex]\[ f(x) = x^2 + 4x - 1 \][/tex]

2. Write down ( g(x) ):

[tex]\[ g(x) = 5x - 7 \][/tex]

3. Perform the multiplication [tex]\( f(x) \cdot g(x) \)[/tex]:

 [tex]\[ f(x) \cdot g(x) = (x^2 + 4x - 1)(5x - 7) \][/tex]

4. Distribute [tex]\( x^2 + 4x - 1 \)[/tex] across ( 5x - 7 ):

 [tex]\[ f(x) \cdot g(x) = x^2 \cdot (5x - 7) + 4x \cdot (5x - 7) - 1 \cdot (5x - 7) \][/tex]

5. Perform the multiplications:

[tex]\[ x^2 \cdot (5x - 7) = 5x^3 - 7x^2 \][/tex]

  [tex]\[ 4x \cdot (5x - 7) = 20x^2 - 28x \][/tex]

 [tex]\[ -1 \cdot (5x - 7) = -5x + 7 \][/tex]

6. Combine all the terms:

[tex]\[ f(x) \cdot g(x) = 5x^3 - 7x^2 + 20x^2 - 28x - 5x + 7 \][/tex]

7. Simplify by combining like terms:

[tex]\[ f(x) \cdot g(x) = 5x^3 + (20x^2 - 7x^2) + (-28x - 5x) + 7 \][/tex]

 [tex]\[ f(x) \cdot g(x) = 5x^3 + 13x^2 - 33x + 7 \][/tex]

Therefore, the product [tex]\( (f \cdot g)(x) \) is \( 5x^3 + 13x^2 - 33x + 7 \).[/tex]

The correct answer is indeed [tex]{C} \),[/tex] which matches [tex]\( 5x^3 + 13x^2 - 33x + 7 \).[/tex]

To find the surface area of a sphere given the volume, first solve for the radius using the volume formula (4/3πr³). In this case, the radius is 3. Then, use the surface area formula (4πr²), which gives the surface area as 36π square inches, or an approximate value of 113.10 square inches.

The volume of a sphere is given by the formula V = 4/3 * π * r³. First, we need to find the radius of the sphere. Set the volume of the sphere (36π in³) equal to the volume formula and solve for r:

36π = 4/3πr³

From this, we find that r = 3. Now, we use the radius to find the surface area with the formula A = 4πr²:

A = 4π * 3² = 36π in²

So, the surface area of a sphere with a volume of 36π in³ is 36π square inches or approximately 113.10 square inches.

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Final answer:

10 mezzanine tickets, 408 balcony tickets, and 853 main floor tickets were sold.

Explanation:

Let's solve this problem step-by-step to find out how many of each type of ticket were sold:

Let's assume that the number of mezzanine tickets sold is x. Therefore, the number of balcony tickets sold is 33x + 78 (since it is 78 more than 33 times the number of mezzanine tickets sold).

The number of main floor tickets sold is 435 + (33x + 78) + x = 435 + 34x + 78 = 34x + 513 (since there were 435 more main floor tickets sold than balcony and mezzanine tickets combined).

The total sales amount is $73,785.

Now, we can set up an equation to solve for x:

$40x + $50(33x + 78) + $59(34x + 513) = $73,785

Simplifying the equation:

40x + 1650x + 3900 + 59(34x + 513) = 73785

40x + 1650x + 3900 + 2006x + 30567 = 73785

3696x + 34467 = 73785

3696x = 39318

x = 39318/3696

x = 10.65

Since we can't have a fraction of a ticket, we can round down to the nearest whole number. So, x = 10.

Therefore, 10 mezzanine tickets were sold, 33x + 78 = 408 balcony tickets were sold, and 34x + 513 = 853 main floor tickets were sold.

Answer:

It is approximately 3.1

Step-by-step explanation:

perimeter = 2L+2W

L=2+w

40 = 2L+2W

40= 2(2+w)+2W

40=4+2w+2w

36=4w

w=9

L=9+2=11

2(9) = 18, 2(11) = 22, 22+18 = 40

L=11

W=9

 Area = L x w

area = 11x9= 99 square yards

(x^2)/a^2+(y^2)/b^2=1

a>b

a=6, a^2=36

foci=(a^2-b^2)^(1/2)

4=(36-b^2)^(1/2)

16=36-b^2

b^2=36-16

b^2=20

b=2(5)^(1/2) or (20)^(1/2)

1=(x^2/36)+(y^2/20)

Answer:

[tex]x=2+-i \sqrt{6}[/tex]

Step-by-step explanation:

[tex]x^2 + 4x + 10[/tex]

To find out the solution we set the expression =0 and solve for x

[tex]x^2 + 4x + 10=0[/tex]

Apply quadratic formula to solve for x

[tex]x=\frac{-b+-\sqrt{b^2-4ac}}{2a}[/tex]

a=1, b=4, c=10 plug in the values in the formula

[tex]x=\frac{-4+-\sqrt{4^2-4(1)(10)}}{2a}[/tex]

[tex]x=\frac{-4+-\sqrt{-24}}{2(1)}[/tex]

The value of square root (-1) is 'i'

[tex]x=\frac{-4+-2i\sqrt{6}}{2}[/tex]

Divide each term by 2

[tex]x=2+-i\sqrt{6}[/tex]

The answer is true. A conditional probability is a measure of the probability of an event given that (by assumption, presumption, assertion or evidence) another event has occurred. If the event of interest is A and the event B is known or assumed to have occurred, "the conditional probability of A given B", or "the probability of A in the condition B", is usually written as P (A|B). The conditional probability of A given B is well-defined as the quotient of the probability of the joint of events A and B, and the probability of B.