For the set of integers {2,3,7,X,9}, find X if 7 is the median of the set
Find all numbers for which the rational expression is undefined z^2+6/z^2-7z-8
The physician ordered Polymox (amoxicillin) oral suspension 20 mg/kg/day in divided doses every 8 hours for a child who weights 66 pounds. Convert pounds to kilograms and then calculate the prescribed dosage. ______ mg every _____ hours
Would you rather have 1/5 share of £12000
Answer:
Yes bc I want you to have some money
Step-by-step explanation:
A container holds 5 quarts of lemonade. How much is this in cups?
The rhombus has vertices K(w, 0), M(w, v), and L(u, z). Which of the following could be coordinates of N?
(u, 0)
(v, w)
(0, z)
(z, 0)
the answer would be the third choice which is N(0, z)
Answer with explanation:
Vertices of Rhombus, KM LN, are : K (w,0), M (w,v) , L (u,z) and N (?).
N (?)= (x,y)
Diagonals of Rhombus Bisect each other.Diagonal, KL and MN will Bisect each other.
Mid Point Formula of Line Joining , (m,n ) and (r,s) is :
[tex]=(\frac{m+r}{2},\frac{n+s}{2})[/tex]
Mid Point of KL is
[tex]=(\frac{w+u}{2},\frac{0+z}{2})[/tex]
Mid Point of MN is
[tex]=(\frac{w+x}{2},\frac{v+y}{2})[/tex]
So, Mid point of KL = Mid Point of MN
[tex](\frac{w+u}{2},\frac{0+z}{2})=(\frac{w+x}{2},\frac{v+y}{2})\\\\ \frac{w+u}{2}=\frac{w+x}{2}\\\\x=u\\\\\frac{0+z}{2}=\frac{v+y}{2}\\\\y=z-v[/tex]
So, coordinates of Point N,can be = (u, z-v).
None, of the Option,matches with the given option.
If you will Write the rhombus as,K L MN,then also you will not get answer which matches with the options.
Need help on this problem plz
Any help like i just had
Divide 2x^3 - 35x-12/ x+4
The following data show the prices of different types of outfits at a store: $2, $2, $28, $26, $25, $27, $25, $27, $26, $28, $30 Which statement is correct about the box plot for the above data?
Answer:
C
2, 2, 25, 25, 26, 26, 27, 28, 28, 30
Minimum: 2
Maximum: 30
Median: 26
Lower quartile: 25
Upper quartile: 28
Step-by-step explanation:
From home, Mary’s work is two thirds along the way to training. Training is 2.5km from work. Mary normally goes to work, then training and then home again. However, today she forgot her shoes. How far will Mary travel in total today if she has to go home before training to get her shoes?
The total distance Mary would have to travel considering she needs to return home for her shoes is 25km.
Explanation:This math problem involves the calculation of distances within a commute. Here's how we can provide a solution:
We first need to calculate how far Mary's home is to her work. If training is 2.5km from work and this represents one third of the travel (since work is two thirds along the way to training), the total distance from Mary's home to training is 2.5km * 3 = 7.5km. Thus, the distance from Mary's home to work is 7.5km * 2/3 = 5km.So, for Mary's normal route - home to work, then work to training, then training to home - she travels 5km (home to work) + 2.5km (work to training) + 7.5km (training to home) = 15km.Today, however, Mary needs to go back home from work for her shoes before she can proceed to training. This path would be: home to work (5km), work to home (5km), home to training (7.5km), and finally, training to home (7.5km) giving a total of 5km + 5km + 7.5km + 7.5km = 25km. So, Mary will travel a total of 25km today due to the forgotten shoes.Learn more about Distance calculation here:
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In one day,Annie traveled 5 times the sum of the number of hours Brian traveled and 2. Together they traveled 20 hours.Find the number of hours each person traveled.
Describe the two possible ways to use the angle of depression that is outside a right triangle?
What is the area of the trapezoid?
30 square units
60 square units
90 square units
120 square units
Answer:
B-60
Step-by-step explanation:
The area of the trapezoid is 60 square units
How to find the area of a trapezoidThe formula for finding the area of a trapezoid is expressed as:
A = 0.5(a+b)h
Given the following parameters
a = AD = √4² + 6²
AD = √16+36
AD = √52
For the length of BC
a = AD = √6² +10²
AD = √36+100
AD = √136
Calculate the height of the trapezium (10, 6) and (8, 12)
H = √6² +2²
H = √40
Substitute
A = 1/2(7.21+11.66)*6.33
A = 60 square units
Hence the area of the trapezoid is 60 square units
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Suppose we are flipping a fair coin (i.e., probability of heads = 0.5 and probability of tails = 0.5). further, suppose we consider the result of heads to be a success. what is the standard deviation of the binomial distribution if we flip the coin 5 times?
Paige pays $532 per month for 5 years for a car. she made a down payment of $3,700.00. if the loan costs 7.1% per year compounded monthly, what was the cash price of the car?
Xavier has $23.50 in his savings account. He deposits $35 every week. His mother also deposits $20 into the account every time Xavier washes the car. His savings account balance can be shown with the following expression:
20c + 35w + 23.50
Part A: Identify a coefficient, a variable, and a constant in this expression. (3 points)
Part B: If Xavier saves for 12 weeks and washes the car 3 times, how much will he have in his account? Show your work to receive full credit. (4 points)
Part C: If Xavier’s mother deposited $25 after each car wash, would the coefficient, variable, or constant in the expression change? Why? (3 points)
The diagram below shows the partial construction of which shape?
a circle inscribed in a circle
an equilateral triangle inscribed in a circle
a regular hexagon inscribed in a circle
a square inscribed in a circle
Answer:
The correct option is 2.
Step-by-step explanation:
Steps for construction of a circle inscribed in a circle:
1. Draw a circle using compass.
2. Draw a diameter of that circle, using the scale.
3. Place the compass on a end point of diameter and draw a full circle, without changing the span on compass.
4. Mark the points of intersection of the two circle.
5. Using scale connect both points of intersection.
6. Using the scale connect each in intersection point with the second end point of diameter.
The diagram below shows the partial construction of a circle inscribed in a circle. Therefore the correct option is 2.
Find the quotient. 22x 2 y 2 ÷ 11x 2 y 2
Answer:
Quotient of 22x²y²÷11x²y² is:
2
Step-by-step explanation:
If a number p is divided by b then,
if p could be written as p=qb+r then q is the quotient and r is the remainder
Here, p=22x²y²
and b=11x²y²
22x²y²= 2(11x²y²)+0
⇒ q=2 and r=0
⇒ quotient=2
Hence, quotient of 22x²y²÷11x²y² is:
2
Solve p=10a+3b for a.
a patio is in the shape of a regular octagon. the sides have length 5m. Calculate the area of the patio
here is the solution.
Round the answer as needed.
A bag has 2 red marbles and 16 blue marbles. Half of the blue marbles are made of glass. A marble is selected at random from the bag. What is the probability that it is a blue, glass marble? Write your answer as a fraction in simplest form.
What is the next answer 3,6,4,8,6,12,10
How do you write 2/100000 as a decimal?
The fraction 2/100000 written in form of a decimal is 0.00002
Given the fraction 2/100000, we are to express this fraction as a decimal
The fraction can also be expressed as;
2/100000 = 2 * 1/00000
2/100000 = 2 * 0.00001
2/100000 = 0.00002
Hence the fraction 2/100000 written in form of a decimal is 0.00002
Learn more on fraction here:https://brainly.com/question/24191335
The equation below represents Function A and the graph represents Function B:
Function A
f(x) = x - 9
Function B
graph of line going through ordered pairs negative 1, negative 3 and 2, 3
Which equation best compares the slopes of the two functions?
Slope of Function B = 2 x Slope of Function A.
Slope of Function A = Slope of Function B
Slope of Function A = 2 x Slope of Function B
Slope of Function B = - Slope of Function A
Answer: The correct option is A., i.e, Slope of Function B = 2 x Slope of Function A.
Explanation:
The given function is,
[tex]f(x)=x-9[/tex]
It can be written as,
[tex]y=x-9[/tex]
It is the slope intercept form like y=mx+c, where m is the slope. On comparing the f(x) with the slope intercept form, we get the slope of f(x) is 1.
The graph of function g(x) passing through the point (-1,-3) and (2,3).
If a line passing through the points [tex](x_1,y_1)[/tex] and [tex](x_2,y_2)[/tex], then the slope of line is,
[tex]m=\frac{y_2-y_1}{x_2-x_1}[/tex]
[tex]m=\frac{3-(-3)}{2-(-1)}=\frac{3+3}{2+1}= \frac{6}{3} =2[/tex]
The slope of g(x) is 2.
Since slope of f(x) is 1 and the slope of g(x) is 2, so we can say that the slope of function B is twice of slope of function A.
Slope of Function B = 2 x Slope of Function A
Therefore, the first option is correct.
The answer is A... yeet
The lengths of the sides of a triangle are 4,5,6 can the triangle still be a right triangle
No. We can use the pythagorean theorem to prove this.The equation being a2 + b2 = c2. We then use two of the least of the three numbers, which are 4 and 5, to substitute for “a” and “b”. We get a value for “c” which is 6.4, rounded off to the nearest tenth. This value is greater than 6. Note that this is a very logical way of solving the problem since a greater number for “a” and “b” would lead a greater value for “c”
Find the volume of the ellipsoid x^2+y^2+9z^2=64
Final answer:
The volume of the ellipsoid x²+y²+9z²=64 is 1024π/3 cubic units.
Explanation:
To find the volume of the ellipsoid given by the equation x²+y²+9z²=64, we can use the formula for the volume of an ellipsoid, which is V = (4/3)πa×b×c, where a, b, and c are the semi-axes of the ellipsoid. In our case, the ellipsoid can be rewritten to show its semi-axes clearly by dividing the equation by 64, which gives us (x²/64) + (y²/64) + (z²/(64/9)) = 1, indicating that our semi-axes are a = b = 8 and c = 8/3. Plugging these values into our volume formula gives us V = (4/3)π×8×8×(8/3), which simplifies to V = 1024π/3 cubic units.
Find an equation of the circle whose diameter has endpoints ( −1,−4) and (3,2) .
Final answer:
The equation of the circle with diameter endpoints (-1,-4) and (3,2) is (x - 1)^2 + (y + 1)^2 = 13, found by calculating the center at (1, -1) and the radius as sqrt(52)/2.
Explanation:
To find an equation of the circle whose diameter has endpoints at (-1,-4) and (3,2), we need to determine the center and radius of the circle. The center of a circle is the midpoint of the diameter, and the radius is half the length of the diameter.
First, we calculate the midpoint (which will be the center of the circle) using the formula: (x1 + x2)/2, (y1 + y2)/2. For the given points (-1,-4) and (3,2), the midpoint is ((-1 + 3)/2, (-4 + 2)/2), which simplifies to (1, -1). So, the center of the circle is (1, -1).
To find the radius, we use the distance formula: sqrt((x2 - x1)^2 + (y2 - y1)^2). The distance between the two points is sqrt((3 - (-1))^2 + (2 - (-4))^2), which simplifies to sqrt(4^2 + 6^2) = sqrt(16 + 36) = sqrt(52). The radius is half of the diameter, so r = sqrt(52)/2.
The standard form of a circle's equation is (x - h)^2 + (y - k)^2 = r^2, where (h, k) is the center of the circle and r is the radius. Substituting the values we found, we get (x - 1)^2 + (y + 1)^2 = (sqrt(52)/2)^2, which simplifies to (x - 1)^2 + (y + 1)^2 = 13. This is the equation of the circle.
The nutritional chart on the side of a box of a cereal states that there are 93 calories in a three fourths 3/4 cup serving. How many calories are in 5 cups of the cereal?
What is the GCF of 12 and 20
Answer:
It is 4.
Step-by-step explanation:
It said so in my classes.