The number of people who are not season ticket holders can be found by subtracting the number of season ticket holders from the total number of attendees:
110801 - 4922 = 105879
Therefore, there are 105879 people who are not season ticket holders.
Substitute -4 for a and 16 for b in the given equations. Which statements are true?
Select all that apply.
-The equation 2 (2x - 11) + 6 = ax + b has no solution.
-The equation 4x - 8 (x - 2) = ax + b has infinitely many solutions.
-The equation -5 (4x-6) 14 = ax + b has exactly one solution.
-The equation 10+ x + 2 - 6x = ax + b has no solution.
-The equation 9x +3 - 13x6 = ax + b has infinitely many solutions.
Answer:
After substituting -4 for "a" and 16 for "b", the equation can be simplified and solved.
-The equation 2 (2x - 11) + 6 = -4x + 16
Expanding the equation on the left-hand side, we get:
4x - 22 + 6 = -4x + 16
Simplifying, we get:
10 = -10x + 32
Subtracting 32 from both sides, we get:
-22 = -10x
Dividing both sides by -10, we get:
x = 2.2
This means that there is exactly one solution, which is x = 2.2. So, statement 3 is true.
-The equation 4x - 8 (x - 2) = -4x + 16
Expanding the equation on the left-hand side, we get:
4x - 8x + 16 = -4x + 16
Combining like terms, we get:
-4x + 16 = -4x + 16
This equation is true for all values of x, so there are infinitely many solutions. So, statement 2 is true.
-The equation 10 + x + 2 - 6x = -4x + 16
Expanding the equation on the left-hand side, we get:
10 + x + 2 - 6x = -4x + 16
Combining like terms, we get:
-5x + 12 = -4x + 16
Adding 4x to both sides, we get:
-x + 12 = 16
Adding x to both sides, we get:
12 = 16
This equation is not true for any values of x, so there are no solutions. So, statement 1 is true.
-The equation 9x +3 - 13x + 6 = -4x + 16
Expanding the equation on the left-hand side, we get:
9x + 3 - 13x + 6 = -4x + 16
Combining like terms, we get:
-4x + 9 = -4x + 16
Adding 4x to both sides, we get:
9 = 12
This equation is not true for any values of x, so there are no solutions. So, statement 1 is true.
Therefore, the true statements are:
-The equation 2 (2x - 11) + 6 = ax + b has no solution.
-The equation 4x - 8 (x - 2) = ax + b has infinitely many solutions.
-The equation -5 (4x-6) 14 = ax + b has exactly one solution.
a plane ticket to beacelona is £175 the price decreased by 6%
how much is the plane ticket now?
Megan dilates ∆JKL about point J by a scale factor of 3/5 to create ∆JNO.
What is the length of segment NO?
Show all work solving for segment NO.
The measure of the length NO after dilation will be 15.
What is a scale factor?The scale factor is the ratio of the actual size of the image to the new size of the image. It is used to Map the objects like if you want to increase or decrease the size without changing the original shape of the image it is done by the scale factor.
Given that to make JNO, Megan enlarges JKL by a scale factor of 3/5 around point J.
The measure of side NO will be calculated as:-
NO = 3 / 5 x 25
NO = 3 x 5
NO = 15
Therefore, the length of the side NO is 15.
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plss help!
An ice cream shop sold a combined total of 367 ice cream cones in the flavors of chocolate or vanilla. They sold 95 more vanilla cones than chocolate. How many chocolate ice cream cones did they sell?
Let's first assign variables to the numbers given.
Let the number of vanilla cones be x and the number of chocolate cones be y.We're given:
[tex]x+y=367[/tex][tex]x=y+95[/tex]Plug the second equation into the first one and solve for y:
[tex]x+y=367\\(y+95)+y=367\\2y+95=367\\2y=272\\y=136[/tex]
Therefore, they sold 136 chocolate cones.
AnswerThey sold 136 chocolate ice cream cones.
Let f(x) = 2√3x and g(x) = -4√3x. Find (f-g)(x), then evaluate when x = 12.
The function operation (f-g)(x) in the functions f(x) = 2√3x and g(x) = -4√3x is 6√3x and the value of (f-g)(12) is 36.
What is the function operation (f-g)(x) and value of (f-g)(12)?A function is simply a relationship that maps one input to one output.
Given that;
f(x) = 2√3xg(x) = -4√3x(f-g)(x) = ?(f-g)(12) = ?First, set up the function;
(f - g)(x) = f(x) - g(x)
Replace the function designators with the actual function.
(f - g)(x) = f(x) - g(x)
(f - g)(x) = 2√3x - (-4√3x)
(f - g)(x) = 2√3x + 4√3x
(f - g)(x) = 6√3x
Now, we evaluate when x = 12.
(f - g)(x) = 6√3x
Replace x with 12
(f - g)( 12 ) = 6√3(12)
(f - g)( 12 ) = 6√36
(f - g)( 12 ) = 6 × 6
(f - g)( 12 ) = 36
Therefore, the function operation (f-g)(x) is 6√3x and (f-g)(12) is 36.
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the base of the rectangle is 7 more than its height x. if the perimeter of the rectangle is greater than 30in find the height
The height of the rectangle must be greater than 4 inches if the perimeter of the rectangle is greater than 30 inches.
In geometry, a rectangle is a quadrilateral with four right angles, and opposite sides are equal in length. The perimeter of a rectangle is the total distance around it.
Let's assume that the height of the rectangle is x inches. According to the problem, the base is 7 more than its height, which means the base is (x + 7) inches.
Now, we can calculate the perimeter of the rectangle using the formula:
Perimeter = 2(length + width)
In a rectangle, the length and width are the same as the base and height, respectively. So, in our case, the perimeter of the rectangle will be:
Perimeter = 2(x + (x + 7)) = 4x + 14
As we are given that the perimeter of the rectangle is greater than 30 inches, we can write the inequality:
4x + 14 > 30
Solving for x, we get:
4x > 16
x > 4
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what is the HCF of the expressions 3(x-y)^2 and 12x^2(x^2+y^2+2xy)
By factorizing the polynomials, the HCF of the expressions 3(x-y)^2 and 12x^2(x^2+y^2+2xy) is 3.
HCF or Highest Common Factor is the greatest number which divides each of the two or more numbers. HCF is also called the Greatest Common Measure (GCM) and Greatest Common Divisor(GCD).
To obtain the HCF of algebraic expression, take the common of all the prime factors of two polynomials.
We first factorize the given algebraic expressions:
3(x - y)^2 = 3 × (x - y) × (x - y)
12x^2(x^2+y^2+2xy) = 12x^2(x + y)^2
12x^2(x + y)^2 = 2 × 2 × 3 × x × x × (x + y) × (x + y)
so, the highest common factor between the both expressions is 3.
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Question 9 Multiple Choice Worth 2 points) (09.06 MC) Sara's kite flew 48 meters in the air. Tayjen's kite flew 5,860 centimeters in the air. How m 00.16 meters 016 meters O106 centimeters 1,060 centimeters
The difference in height between Sarah and Tayjen kite is 1060 cm (10.6 m)
What is an equation?An equation is an expression that shows how numbers and variables are linked together using mathematical operations such as addition, subtraction, multiplication and division.
1 m = 100 cm
Sara's kite flew 48 meters in the air. Hence:
Height of Sarah kite = 48 m = 48 m * 100 cm per m = 4800 cm
Tayjen's kite flew 5,860 centimeters in the air. Therefore:
Difference in height = 5860 - 4800 = 1060 cm = 1060 cm * 1 m per 100 cm = 10.6 m
The difference in height is 1060 cm (10.6 m)
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Mr. Taylor has been looking at buying a house, and he is even thinking about having a pool put into his backyard!
Your Task: Design a pool that will fit inside Mr. Taylor's backyard and find out how much water it will take to fill the pool.
Rules!
1. Your pool design must include at least two different solids that are connected
2. Your pool must fit inside Mr. Taylor's backyard and leave at least 3 feet of space on each side of it for construction purposes
3. Your pool must be accessible and realistic
*Look at the photo for the blueprint of the house.
*You must clearly describe the pool design. Write this in a word-written response
To design a pool that would fit inside Mr. Taylor's backyard, you would need to know the dimensions of the available space.
You would also need to take into account any landscaping, slopes, and other features of the backyard that could impact the design and construction of the pool.
Once you have the necessary information about the backyard, you can start designing a pool that would be accessible and realistic. Here are some tips and guidelines for designing a pool.
Choose a shape and size that fits the available space and is functional. Rectangular or oval shapes are typically the most common and practical, but other shapes can be used as well.
Consider the depth of the pool. For safety reasons, the depth should be at least 4 feet at the shallow end and 8 feet at the deep end. You may also want to consider adding a gradual slope in the pool to make it easier for people to enter and exit.
Choose the material for the pool. Concrete, fiberglass, and vinyl are common materials used for pools. Each material has its own advantages and disadvantages, so research the options and choose the one that is best for your design and budget.
Consider adding features such as a diving board, slide, or waterfall to make the pool more enjoyable and attractive.
Calculate the amount of water it will take to fill the pool. This will depend on the size and depth of the pool. To get an estimate, you can use online pool volume calculators or consult with a pool contractor.
Once you have a design for the pool and know how much water it will take to fill, you can determine if it is feasible and within Mr. Taylor's budget.
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At soccer practice last night, Leroy made 4 times as many penalty kicks as he missed.
Pick the diagram that models the ratio in the story.
If Leroy made 9 more penalty kicks than he missed, how many penalty kicks did he make?
Penalty kicks:
The model that would model the ratio is 4 : 1
the penalties made is given as 12
How to solve for the penaltiesTo get the penalty kicks that he made given that he made 9 more penalty kicks than he missed
let the penalty kicks be
= x
if he made more than 9 than missed we would have
x + 9 = 4
x = 1
cross multiply
1 (x + 9) = 4 * X
x + 9 = 4x
9 = 3x
x = 3
since x + 9 penalties made
3 + 9 = 12
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A, B, C and D are points on the circumference of a circle, centre O. ED is a tangent to the circle. Angle ODB= 25degrees. Work out angle BAD. You must give a reason for each stage of your working.
Can someone please help!
Thank you
the angle BAD is 75 degrees and we used the properties of angles in a circle and the tangent-secant theorem to find angle BAD .
To work out angle BAD, we need to use the properties of angles in a circle and the tangent-secant theorem. Here are the steps to solve the problem:
Identify the relevant angles First, we need to draw a diagram to visualize the problem. We have a circle with center O, points A, B, C, and D on the circumference, and tangent ED. Angle ODB is given as 25 degrees. We need to find angle BAD. We can label the angles in the diagram as follows:
Angle AOB = 2x (angle at the center is twice the angle at the circumference)
Angle BCD = x (angles in the same segment are equal)
Angle OBD = 90 degrees (tangent and radius are perpendicular)
Angle OED = 90 degrees (tangent and radius are perpendicular)
Angle ABD = y (we need to find this angle)
Angle BAD = z (we need to find this angle)
Use the sum of angles in a triangle
We notice that triangle ABD is a right triangle, with right angle at B. Therefore, angles ABD and BAD are complementary. That is, ABD + BAD = 90 degrees. Use the tangent-secant theorem
We can use the tangent-secant theorem to find the value of angle ABD. The tangent-secant theorem states that if a tangent and a secant intersect at a point on a circle, then the angle between the tangent and the secant is equal to the half the difference of the intercepted arcs. In our diagram, ED is a tangent, and BD is a secant. Therefore, angle ODB = 25 degrees is half the difference of the intercepted arcs AD and AB. That is, angle ABD = (2x - x)/2 = x/2.
Solve for x
To find x, we can use the fact that the angles in a triangle add up to 180 degrees. Therefore, x + 2x + 90 = 180 (sum of angles in triangle AOB). Solving for x, we get x = 30 degrees.
Find angle ABD and angle BAD
Using the result from step 3, we get ABD = x/2 = 15 degrees. Using the result from step 2, we get BAD = 90 - ABD = 75 degrees.
Therefore, the angle BAD is 75 degrees. In summary, we used the properties of angles in a circle and the tangent-secant theorem to find angle BAD. We noticed that ABD and BAD are complementary, and we used the tangent-secant theorem to find ABD. Then, we solved for x using the fact that the angles in a triangle add up to 180 degrees. Finally, we used the results from steps 2 and 3 to find BAD.
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find the volume of the cylinder 9in and 5in
706.5 in³
Step-by-step explanation:The volume of a shape describes the amount of space a shape takes up.
Volume Formula
For a cylinder, the volume formula is V = πr²h. In this formula, V represents the total volume. Additionally, π represents the constant pi, which is approximately 3.14. The variable r represents the radius. Remember that radius is the distance from the center of the circle to the edge. Finally, h is the height of the cylinder.
Solving for Volume
The diagram shows that the radius is 5in. We know this because the distance from the center to the edge of the circle is 5in. Additionally, the height is 9in. Now, we can plug these values into the formula.
V = π(5)² * 9V = 225πV ≈ 706.5For this calculation, I used 3.14 for π. The unrounded volume in terms of pi is 225π.
The volume of the cylinder is 706.5 in³.
the same type of machines are used in two factories, a and b. with statistical data on 1000 machines operated in factory a, the reliability of the machine is estimated to be 0.99. statistics from factory b show that 5 machines failed out of 600 machines operated in factory b. based on the statistics from both factories, what is the reliability of the machine?
The reliability of the machine can be estimated to be 0.9833, calculated as (1000 - 1) / 1000 + (600 - 5) / 600. we can take the average of the two reliability estimates, giving us a reliability of 0.9833.
The reliability of a machine can be estimated by taking the ratio of machines that did not fail to the total number of machines operated in a given period. In this case, the reliability of the machine from Factory A can be estimated to be 0.99 (1000 - 1 / 1000). The reliability of the machine from Factory B can be estimated to be 0.9833 (600 - 5 / 600). To estimate the reliability of the machine based on both factories, we can take the average of the two reliability estimates, giving us a reliability of 0.9833.
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what distance does the tip of the minute hand on a clock travel in 11 minutes if the minute hand is 23 cm long?
The tip of the minute hand on a clock travels approximately 26.4 cm in 11 minutes if the minute hand is 23 cm long.
What is Circle?
A circle is a two-dimensional geometric shape that is defined as the set of all points in a plane that are a fixed distance away from a given point, called the center of the circle. This distance is known as the radius of the circle.
A circle can also be defined as the locus of a point that moves in a plane in such a way that its distance from a fixed point is constant. The constant distance is the radius of the circle.
The minute hand on a clock makes a full rotation in 60 minutes, which means it travels the circumference of a circle with a radius of 23 cm in 60 minutes. The formula for the circumference of a circle is C = 2πr, where r is the radius of the circle, and π is a mathematical constant approximately equal to 3.14.
Therefore, the circumference of the circle traced by the tip of the minute hand is:
C = 2πr = 2 × 3.14 × 23 cm ≈ 144.44 cm
To find out how far the minute hand travels in 11 minutes, we need to calculate what fraction of the circumference it covers in that time. Since 11 minutes is about 18.3% of an hour (60 minutes), the minute hand travels 18.3% of the circumference of the circle in that time:
Distance traveled = 0.183 × 144.44 cm ≈ 26.4 cm
Therefore, the tip of the minute hand on a clock travels approximately 26.4 cm in 11 minutes if the minute hand is 23 cm long.
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Problem
Aurelia has a coin that she suspects is unfair. She wants to test
H
0
:
p
=
0.5
H
0
:p=0.5H, start subscript, 0, end subscript, colon, p, equals, 0, point, 5 versus
H
a
:
p
≠
0.5
H
a
:p
=0.5H, start subscript, start text, a, end text, end subscript, colon, p, does not equal, 0, point, 5, where
p
pp is the proportion of flips that this coin lands showing heads.
She flipped the coin
100
100100 times and it landed showing heads
43
4343 of those times.
Which of the following represents the P-value for Aurelia's test?
The correct option is C, P - value is 0.0718.
Describe sample percentageA sample proportion in statistics is a measurement of the proportion or percentage of a sample that demonstrates an important characteristic or quality. It is computed by dividing the sample's overall population by the proportion of participants who exhibit the characteristic.
For instance, if a sample of 100 individuals is chosen to estimate the percentage of people who love chocolate ice cream, and 30 of those individuals state that they do, the sample proportion would be 0.3 or 30%, as 30 out of 100 individuals state that they do.
We must first compute the test statistic in order to determine the P-value for Aurelia's test. The test statistic has a typical normal distribution when the null hypothesis is true.
The sample proportion of heads is:
p' = 43/100 = 0.43
The test statistic is:
[tex]z = \frac{(p' - p)}{ \sqrt{(p(1-p) / n)}}[/tex]
where p is the hypothesized proportion under the null hypothesis, and n is the sample size.
Substituting the given values, we get:
[tex]z = \frac{(0.43 - 0.5)}{/ {sqrt(0.5 \times 0.5 / 100)}} = -1.8[/tex]
Since this is a two-sided test, we need to find the area under the standard normal distribution curve in both tails of the distribution that is more extreme than the observed test statistic.
Using a standard normal distribution table, we find that the area to the left of -1.8 is 0.0359. Therefore, the area in both tails is:
P-value = 2 × 0.0359 = 0.0718
So, the correct answer is:
c) 0.0718
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Answer:C
Step-by-step explanation: Kahn Academy
PLEASE HELP ASAP??!!!
Andrew factored the polynomial 3x²y 6xy² as 3xy(x – 2y). Determine
if he is correct. If he is incorrect, help him fix his error. If he is correct, explain what
he did to get his answer.
Answer:
He is correct.
Step-by-step explanation:
Shown in picture.
Hope its clear.
What is the measure of the smallest angle?
one line has 2x #2 had 3x - 11 #3 had 2x + 9
67°
69°
52°
61°
In the preceding equation the measure of the smallest angle is 52° in length.
What are the names of angles 2 and 3?Internal angles 2 and 3 are alternate options. Two angles that share a vertex and a side but no interior points in common. two angles that don't have any shared interior points but do have a common vertex and side.
We know that a triangle has 180 angles altogether.
So, 2x + 3x - 11 + 2x + 9 = 180
7x - 2 = 180
7x = 180 + 2
x = 182 / 7
x = 26
Now, magnitude of angles = 2x = 2(26) = 52 [ Smallest ]
3x - 11 = 3(26) - 11 = 78 - 11 = 67 [ Largest ]
2x +9 = 2(26) + 9 = 52 + 9 = 61
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3. Find the height of the tree below to the nearest foot.
The height of the tree to the nearest foot is 27 feet.
How to find the height of a tree?The height of the tree can be found as follows:
The height of the tree can be found using trigonometric ratios. Therefore,
let
tan ∅ = opposite / adjacent
Therefore,
opposite side = adjacent tan ∅
Hence,
height of the tree = 20 + x tan 45° = x tan 75°
20 + x tan 45° = x tan 75°
20 tan 45 + x tan 45° = x tan 75°
20 tan 45 = x tan 75° - x tan 45°
20 tan 45 = x(tan 75 - tan 45)
20 tan 45 = x(3.73205080757 - 1)
2.73205x = 20
x = 20 / 2.73
x = 7.32600732601
x = 7.34
Therefore,
height of the tree = x tan 75°
height of the tree = 7.34 × tan 75°
height of the tree = 27.3186119114
height of the tree = 27 ft
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A rope is tied from the top of a flag pole to the ground. If the rope is 28 ft long and makes a 15 degree angle with the ground, how far away is where it is tied to the base of the flag pole? Round your answer to the nearest hundredth
The distance of the rope to the base of the flagpole is 27.05 ft.
How to find the distance of the rope to the flag pole?A rope is tied from the top of a flag pole to the ground. If the rope is 28 ft long and makes a 15 degree angle with the ground, the distance of the rope to the base of the flag pole can be calculated as follows:
The situation forms a right angle triangle.
Hence,
using trigonometric ratios,
cos 15° = adjacent / hypotenuse
cos 15° = x / 28
cross multiply
Therefore,
x = 28 cos 15
x = 28 × 0.96592582628
x = 27.0459231361
x = 27.05 ft
Therefore,
distance of the flagpole to the base of the ground = 27.05 ft
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please help will give brainliest
Answer:
First option: 37°, 11°, 132°
Step-by-step explanation:
The sum of the three interior angles of a triangle must add up to 180°
Only the first option 37°, 11° and 132° add up to 180°
37 + 11 + 132 = 48 + 132 = 180°
You don't need to add up all the other sets of angles completely. Just look at the units place
Option 2, units sum = 4 + 6 + 1 =11; does not end in a 0, ends in 1
Option 3: units sum = 1 + 0 + 2; does not end in a 0, ends in 3
Option 4: units sum = 0 + 1 + 5 ends in a 6
Please answer it’s for school
Using the vertices given, the area of triangle PQR is 18 squared units
What is the area of the triangleThe area of triangle PQR can be found using the Shoelace Theorem. This theorem states that the area of a polygon can be calculated by taking the sum of the products of the coordinates of its vertices and subtracting the sum of the products of the coordinates of its vertices in reverse order.
In this case, the vertices of triangle PQR are P(-8, 2), Q(-2, 4), and R(-6, 8), so the area can be calculated as follows:
A = 1/2 * |(-8 * 4) + (-2 * 8) + (-6 * 2) - (2 * -2) - (4 * -6) - (8 * -8)| = 1/2 * |-32 + 16 + -12 - 4 + 24 + 64| = 1/2 * |36| = 18 square units
So the area of triangle PQR is 18 square units.
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What is the value of x?
What is the value of y?
What is the value of z?
Answer:
X=63
Y=63
Z=72
Step-by-step explanation:
The value for angle X
X + 85 + 32 = 180°
X + 117 = 180°
X = 180° - 117°
X = 63°
Since <x and <y are vertically opposite
<X and <Y = 63°
Remember vertically opposite are the same.
The value for angle z
Z + 45 + Y = 180°
Z + 45 + 63 = 180°
Z° + 108° = 180° - 108°
Z = 72°
Therefore
Value for X = 63°
Value for Y = 63°
Value for Z = 72°
Problem: Solve the equation AB = BC for A, assuming that A, B, and C are square and B is invertible.
I do know how to solve for A to show that it's invertible which is by finding a matrix C such that AC = CA = i, then C = A^-1
Theorem: If A and B are invertible then AB is invertible
(AB)^-1 = B^-1A^-1
Please help in finding B
Given the equation AB = BC, we want to find B, assuming that A, B, and C are square matrices and B is invertible. We can conclude that B is invertible.
To do this, we will use the fact that if A is invertible, then we can multiply both sides of the equation by its inverse to isolate B:
AB = BC
[tex]A^-1 AB = A^-1 BC[/tex]
B = A^-1 BC
Here, A^-1 is the inverse of A, and it satisfies the equation[tex]A A^-1 = A^-1 A[/tex]= I, where I is the identity matrix. By multiplying both sides of the equation [tex]AB = BC by A^-1[/tex], we obtain the expression for B.
Now, let's consider the invertibility of B. If A and B are invertible, then the product AB is also invertible. This is because the product of two invertible matrices is invertible, and its inverse is given by the formula [tex](AB)^-1 = B^-1A^-1[/tex]. In this case, since[tex]B = A^-1 BC,[/tex] we can conclude that B is invertible.
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Sorry for the grease LOL was eating a big mac also this is urgent
Jada's grandparents started a savings account for her in 2010. The table shows the
amount in the account each year.
If this relationship is graphed with the year on the horizontal axis and the amount in
dollars on the vertical axis, what is the vertical intercept? What does it mean in this
context?
2
year
2010
2012
2014
2016
1gnibasi
Seadsh
amount in dollars
The vertical intercept for the table showing the relationship for Jada's grandparents starting a savings account for her is starting savings amount in the account of $ 600.
What is the vertical intercept in a graph ?The vertical intercept in a graph is the point where a line intersects the vertical axis of the coordinate plane. It represents the value of the dependent variable (y) when the independent variable (x) is equal to zero.
The vertical intercept would therefore be first amount in the savings account by Jada's grandparents which is the $ 600. This is the amount when x = 0 or rather when x was the starting year of 2006.
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Chandra just spends 15 minutes away or math problems she spends the same amount of time on each problem how many minutes does she spend on each problem
Chandra spends 3 minutes on each math problem if she spends a total of 15 minutes on math problems and spends the same amount of time on each problem
Chandra spends the same amount of time on each math problem. Let's call the amount of time she spends on each problem "t".
We know that Chandra spends a total of 15 minutes on math problems. If she spends the same amount of time on each problem, then the total time spent on all the problems is equal to the number of problems multiplied by the time spent on each problem.
So, we can write the following equation:
total time spent on all problems = number of problems * time spent on each problem
We know that the total time spent on all problems is 15 minutes, so we can substitute this into the equation:
15 = number of problems * t
We don't know the number of problems, but we can solve for t by rearranging the equation:
t = 15 / number of problems
So, the amount of time Chandra spends on each math problem is equal to 15 divided by the number of problems.
For example, if Chandra works on 5 math problems, then the amount of time she spends on each problem is:
t = 15 / 5 = 3
So, Chandra spends 3 minutes on each math problem if she spends a total of 15 minutes on math problems and spends the same amount of time on each problem.
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Solve the system of linear equations by graphing.
y=-1/2x+2
y=1/2x-1
=negative 3 comma one half
=one half comma 3
=one half comma negative 3
=3 comma one half
From the graphs below, we can see that the solution of the given system of linear equations is (3,0.5).
What is meant by a system of linear equations?
A collection of one or more linear equations containing the same variables is known as a system of linear equations. An equation is said to be linear if the maximum power of the variable is consistently 1. Another name for it is a one-degree equation. A linear equation is invariably a straight line equation. A group of diverse straight line equations make up a system of linear equations.
We are given two linear equations:
y = -1/2 x + 2
y = 1/2x - 1
As mentioned earlier, these are equations of two straight lines with slopes -1/2 and 1/2.
Now the solution of the equation is the intersecting point of these straight lines. We graph these equations and found the intersecting point.
Therefore, from the graphs below, the solution of the given system of linear equations is (3,0.5).
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Daniel was given a large box of 36 chocolates for his birthday. If he eats exactly 3
chocolates each day, how many chocolates would Daniel have remaining 8 days after
his birthday?
Answer:12
Step-by-step explanation:
8 times 3 equals 24.24 subtract36 get 12
Two sides of a triangle are
shown. Find the range of
values of the third side.
8, 5
< X <
The range of values for the third side must be 5 < C < 13 this means that the third side must be a value greater than 5 and less than 13.
What is triangle?
A triangle is a two-dimensional geometric shape with three sides and three angles. It is a basic polygon and one of the simplest shapes in geometry. Triangles come in different types based on the length of their sides or the measure of their angles, such as equilateral triangles (all sides are equal), isosceles triangles (two sides are equal), scalene triangles (no sides are equal), right triangles (one angle measures 90 degrees), and obtuse triangles (one angle measures greater than 90 degrees).
The third side of a triangle must satisfy the triangle inequality theorem, which states that the sum of the lengths of any two sides of a triangle must be greater than the length of the third side. In other words, for a triangle with sides A, B, and C, we have:
A + B > C
B + C > A
A + C > B
For the given sides of 8 and 5, the range of values for the third side can be found by considering the two inequalities:
5 + C > 8
8 + C > 5
Adding the two inequalities, we get:
13 > C
So the range of values for the third side must be:
5 < C < 13
This means that the third side must be a value greater than 5 and less than 13.
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Find the mode of each group of numbers:
62,63,67,66,66,63,62,68,69,65,67,63,64,68,65,62,69,63,61,60,63,65
The mode of the data set given is 63.
What is the Mode of a dataset?Statistics uses the terms mean, median, and mode to describe central tendency. They each provide information about what value in a data set is conventional or representative of the data set in their own unique ways.
The number that appears the most frequently in a piece of data is the mode. Count the occurrences of each number in the data collection. The figure with the largest total is the mode. More than one mode is acceptable. Additionally, there is no mode if all numbers appear exactly once.
Given that:
62,63,67,66,66,63,62,68,69,65,67,63,64,
By rearrangement, we have:
62, 62, 63, 63, 63, 64, 65, 66, 66, 67, 67, 68, 69
Therefore, the highest occurring number(mode) is 63.
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The image of a trapezoid is shown.
An isosceles trapezoid with a short base of 3 meters and a height of 5.8 meters. The portion of the large base from the left vertex to the perpendicular is 4 meters. The portion of the large base from the right vertex to the perpendicular is 7 meters.
What is the area of the trapezoid?
The area of the trapezoid would be 42.5 m².
What is the area of a trapezoid?
The area of a trapezoid is given by the formula:
Area = (1/2) × (sum of the bases) × height
where the bases are the two parallel sides of the trapezoid and the height is the perpendicular distance between the bases.
The parameters of the trapezoid are;
Short base length = 3 m
Height = 5
Large base length = 4 + 3 + 7 = 14 m
Thus;
Area of a trapezoid = 1/2 * (Short base + Large base) * h
Area = 1/2 * (3 + 14) * 5
= 1/2 * 17 * 5
= 42.5 m²
Hence, the area of the trapezoid would be 42.5 m².
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