what is the solution of -3p+4<22?

To calculate the length of MF, find the midpoint M of CF using the midpoint formula, then use the distance formula to determine the length of MF, which is 5.0 cm.

To find the length of the segment MF, we must first determine the coordinates of the midpoint M of the segment CF. Since C has coordinates (1, 2) and F has coordinates (7, 10), we use the midpoint formula which is ( (x1 + x2)/2, (y1 + y2)/2 ). Calculating this for C and F gives us the coordinates of M as:

Therefore, M has coordinates (4, 6). Now, to find the distance MF, we use the distance formula between points M and F:

MF = √[(x2 - x1)² + (y2 - y1)²] where (x1, y1) are the coordinates of M and (x2, y2) are the coordinates of F.

Replacing with the known values:

MF = √[(7 - 4)² + (10 - 6)²]

MF = √[3² + 4²] = √[9 + 16] = √25 = 5.0 cm

Thus, the length of the segment MF is 5.0 cm.

Answer:

x= 80

y= 130

Step-by-step explanation:

The correct values of x and y that make k || j and m || n are x = 130 and y = 130.

To find the values of x and y, we need to use the fact that if two lines are parallel, their corresponding angles are equal.

Given that k is parallel to j, we have:

x = 50 (corresponding angles)

Since m is parallel to n, we have:

y + 80 = 210 (corresponding angles)

Solving for y:

y = 210 - 80

y = 130

Now, we have the value of x as 50 and the value of y as 130. However, we also know that the angles x and y are supplementary because they form a straight line. Therefore, their sum must be 180 degrees.

x + y = 180

50 + y = 180

y = 180 - 50

y = 130

This confirms that y is indeed 130 degrees. Since x and y are supplementary and both equal to 130 degrees, we have a contradiction because the sum of x and y should be 180 degrees.

To resolve this contradiction, we must re-evaluate our initial assumption that x = 50 degrees. Since x and y are supplementary, and we have correctly determined that y = 130 degrees, we must have:

x + y = 180

x + 130 = 180

x = 180 - 130

x = 50

This is incorrect because we initially assumed x = 50 degrees based on corresponding angles, but we did not consider that the angle adjacent to x on line k is not given and could be different from the corresponding angle of 50 degrees on line j.

To correct this, we should consider the angle adjacent to x on line k, which must sum up with x to 180 degrees because of the straight line. Let's call this angle x'. Since k is parallel to j, x' corresponds to the angle of 130 degrees on line j. Therefore, we have:

x' + x = 180

130 + x = 180

x = 180 - 130

x = 50

Now, considering that x and y are supplementary:

x + y = 180

50 + y = 180

y = 180 - 50

y = 130

Thus, we have x = 50 degrees and y = 130 degrees, which are indeed the values that make k || j and m || n. However, since x and y are supplementary, they must both be 130 degrees to satisfy the conditions of the problem.

Therefore, the correct values are x = 130 degrees and y = 130 degrees.

You would need to pull out 21 socks from the dryer to ensure you have a black pair since you might initially pull out all 19 green socks before getting to the black ones.

To determine how many socks one would need to pull out of the dryer to be sure to get a pair of black socks when you have 19 black socks and 19 green socks, consider the worst-case scenario. In the worst case, you pull out all 19 green socks one by one. Since you have not yet pulled out a single black sock, the 20th sock you pull out has to be black, because there are no more green socks left. However, to ensure you have a pair of black socks, you will need to pull out one more sock. So the answer is that you need to pull out 21 socks to be certain of having a pair of black socks.

Based on the information, the correct option is 4. Reflexive Property of congruent to; SSS

The reflexive property of congruence states that any geometric figure is congruent to itself. In other words, any shape or object is congruent to itself.

For example, if we have a triangle ABC, we can say that triangle ABC is congruent to triangle ABC. This is because all the corresponding sides and angles of the two triangles are equal, and they represent the same geometric figure.

NO and ON are the same line. They are congruent by the reflexive property (a line segment is a reflection of itself). Shape MNO and shape PON are congruent by side-side-side since:

side PN = side MO

side MN = side PO

side NO = side ON

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Answer: D. {12, 13, 14, 15, 16, 17, 18}

Step-by-step explanation:

The union of two sets A and B is the set of elements which are in A, in B, or in both A and B, without repetition.

In this case, the union of the sets G and H will be the set of elements in G= {12, 14, 16, 18}  and then the set of elements in H= {13, 15, 17, 18}, excluding those that already were in G, which in this case is the number 18.

Then:

G ∪ H={12, 13, 14, 15, 16, 17, 18}

perimeter = 2L +2w

L = w+11

70 = 2(w+11) +2w

70 = 2w+22+2w

70= 4w + 22

48 = 4w

w=48/4 = 12

width = 12

length = 12+11 = 23

2x12 = 24

2x23 = 46

46+24 = 40

 length = 23 inches, width = 12 inches

Answer is D

Answer:

The answer is the option D

[tex]12\ inches[/tex]

Step-by-step explanation:

we know that

The perimeter of a rectangle is equal to

[tex]P=2L+2W[/tex]

where

L is the length side of the rectangle

W is the width side of the rectangle

In this problem we have

[tex]P=70\ in[/tex]

so

[tex]70=2L+2W[/tex] ------> equation A

[tex]L=W+11[/tex] ------> equation B

Substitute equation B in equation A and solve for W

[tex]70=2[W+11]+2W[/tex]

[tex]70=2W+22+2W[/tex]

[tex]4W=70-22[/tex]

[tex]W=48/4[/tex]

[tex]W=12\ in[/tex]

Answer:

Step-by-steThe first step for solving this expression is to distribute -y through the parenthesis.

3y³ - 2y × (4y - y² + 3y) - (2y × (y + 1) - 3y × (y² - 1))

Distribute 2y through the parenthesis.

3y³ - 2y × (4y - y² + 3y) - (2y² + 2y - 3y × (y² - 1))

Now distribute -3y through the parenthesis.

3y³ - 2y × (4y - y² + 3y) - (2y² + 2y - 3y³ + 3y)

Collect the like terms in the first set of the parenthesis.

3y³ - 2y × (7y - y²) - (2y² + 2y - 3y³ + 3y)

Collect the like terms in the second set of the parenthesis.

3y³ - 2y × (7y - y²) - (2y² + 5y - 3y³)

Distribute -2y through the parenthesis.

3y³ - 14y² + 2y³ - (2y² + 5y - 3y³)

Remember that when there is a "-" sign in front of the parenthesis,, you must change the sign of each term in the parenthesis. This will change the expression to the following:

3y³ - 14y² + 2y³ - 2y² - 5y + 3y³

Collect the like terms with an exponent of 3.

8y³ - 14y² - 2y² - 5y

Lastly,, collect like terms that have an exponent of 2.

8y³ - 16y² - 5y

Since we cannot simplify the expression any further,, the correct answer is going to be 8y³ - 16y² - 5y.

Let me know if you have any further questions.

we know that

The area of a circle is equal to

[tex]A=\pi r^{2}[/tex]

where

r is the radius of the circle

In this problem we have

[tex]r=9\ in[/tex]

substitute in the formula

[tex]A=\pi*9^{2}=81 \pi\ in^{2}[/tex]

The area of the complete circle subtends [tex]360\ degrees[/tex]

When the time is 4:00 the angle formed by the hands of a clock is [tex]120\ degrees[/tex]

so by proportion

Find the area of the sector area

[tex]\frac{81\pi}{360} \frac{in^{2}}{degree} =\frac{x}{120} \frac{in^{2}}{degree} \\ \\x=120*81 \pi /360\\ \\x=27 \pi\ in^{2}[/tex]

therefore

the answer is the option

[tex]27 \pi\ in^{2}[/tex]

Answer:

2r=d stands as correct

Step-by-step explanation:

A fracture in the left femoral region that is 5 centimeters proximal to the patellar region and 30 centimeters distal to the coxal region will be located in the midshaft of the femur.

The femur is the long bone in the thigh, and it has distinct regions:

Coxal Region (Hip Region):

This refers to the upper end of the femur, which articulates with the hip bone (coxal bone).

A fracture occurring here would typically be near the hip joint.

Patellar Region (Knee Region):

This refers to the lower end of the femur, where it articulates with the patella (knee cap).

A fracture here would typically involve the knee joint.

Midshaft of the Femur:

This is the region between the coxal and patellar regions.

A fracture that is 5 centimeters proximal (closer to the hip) to the patellar region and 30 centimeters distal (away from the hip) to the coxal region would be located in the midshaft of the femur.

Fractures in the midshaft of the femur can vary in severity, and treatment may depend on factors such as the type of fracture (e.g., simple, comminuted), the extent of displacement, and the patient's overall health.

These fractures are often serious and may require surgical intervention, such as the placement of pins, screws, or a metal rod to stabilize the bone and promote proper healing.

Rehabilitation and physical therapy are also crucial for recovery and restoring function.

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Answer:

10.67 kg of gravel can be safely lifted by the crane

Step-by-step explanation:

Maximum load that a crane can support = 20000 kg.

Bucket has a mass = 4000 kg

Gravel has a mass = 1500 kg for every cubic meter.

Let the volume of gravel is = g cubic meter

Therefore, mass of the gravel = 1500g kg

Now we form an equation to show the weight that the crane cable can support

Mass of Bucket + mass of Gravel = Total mass that a lift can support

4000 + 1500g = 20000

1500g = 20000 - 4000

1500g = 16000

[tex]g=\frac{16000}{1500}[/tex]

g = 10.67 kg

Therefore, 10.67 kg of gravel can be safely lifted by the crane.

In a college of exactly 2740 students, exactly 55 % are male. 1233 is the number of female students.

A percentage is a number or ratio that can be expressed as a fraction of 100. A percentage is a number or ratio expressed as a fraction of 100. It is often denoted using the percent sign, "%", although the abbreviations "pct.", "pct" and sometimes "pc" are also used. A percentage is a dimensionless number; it has no unit of measurement.

here, we have,

In a college of exactly 2740 students,

exactly 55 % are male.

i.e. female students = 45%

so, the number of female students = 2740*45%

                                                         =1233

Hence, In a college of exactly 2740 students, exactly 55 % are male. 1233 is the number of female students.

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Hello : let  A(-3,-1)    B(-6,8)
the slope is :   (YB - YA)/(XB -XA)
(8+1)/(-6+3)  =9/(-3)
the slope is: -3

To find out how much Mark should pay for one draw, calculate the expected value by multiplying the payouts for a heart, a jack, and the jack of hearts by their respective probabilities. Sum these values to find the amount Mark should pay per draw to make the game fair, which is $0.135.

To determine how much Mark should pay for one draw from the deck of 52 cards, we need to calculate the expected value (EV) of one draw. The EV is calculated by multiplying each outcome by its probability and summing these products.

The deck has 13 hearts, so the probability of drawing a heart (excluding the jack of hearts) is 12/52 or 3/13. Drawing any jack other than the jack of hearts has 3 possible outcomes in the remaining 51 cards; the probability is 3/52. The jack of hearts is a single card with a probability of 1/52. The remaining 36 cards are neither hearts nor jacks and yield no payout.

The EV is calculated as follows:

(12/52 × $0.35) for a heart

(3/52 × $0.55) for a jack

(1/52 × $0.85) for the jack of hearts
Adding these up we get: (3/13 × $0.35) + (3/52 × $0.55) + (1/52 × $0.85) = $0.13538. To ensure the game is fair and the host neither loses nor gains money in the long term, Mark should pay $0.135 per draw.