Answer:
Let x be the number of additional miles Tammy needs to run this week to reach her goal of at least 10 miles per week.
To determine the inequality, we can start with the given information and use the inequality symbol for "greater than or equal to" (≥):
4.5 + x ≥ 10
This inequality states that the sum of the distance Tammy has already run this week (4.5 miles) and the additional distance she still needs to run (x miles) must be greater than or equal to 10 miles in total for her to reach her goal.
To solve for x, we can start by subtracting 4.5 from both sides of the inequality:
x ≥ 10 - 4.5
Simplifying, we get:
x ≥ 5.5
Therefore, Tammy must run at least 5.5 more miles this week to reach her goal of at least 10 miles per week.
Step-by-step explanation:
wag na mag delete pls lng ang bob0 nyo namn pag na delete nyo toh mga admin
Mr. Nava knows that the relationship between the number of gallons of gasoline his
car uses, g, and the number of miles he travels, m, is proportional.
Which equation could represent this relationship?
mg = 35
Om = 25+g
m = 32/g
m = 27g
The equation that could that represents the relationship is: m = 27g
What is variation?Variation is a topic which expresses the relationship between two variables in the form of an equation. The two variables are known as dependent and independent variables.
Considering Mr. Nava's statement, since the number of gallons of gasoline has a direct relationship to the number of miles he travels, then;
m [tex]\alpha[/tex] g
m = kg
where k is the constant of proportionality
This implies that the more the amount of gasoline in his car, then the more the number of mile that he will travel.
Therefore, the equation that represents this relationship is:
m = 27g
where the value of k is 27
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Translate the shape by the vector
Y₁
9
8
7
6
5
4
3
2
1
O
1
2 3 4 5 6 7
5
89
X
Answer: Your welcome!
Step-by-step explanation:
14
13
12
11
10
9
8
7
6
O
6
7 8 9 10 11 12 13
10
1415
The answer is 14, 13, 12, 11, 10, 9, 8, 7, 6, O, 6, 7, 8, 9, 10, 11, 12, 13, 10, 14, 15. This is the result of translating the shape by the vector (5, 4). The original shape was shifted 5 units to the right and 4 units down, resulting in the new shape.
Below shows the angle of refraction of an unknown liquid when a light shines through it. Determine the refractive index of the liquid. Round your answer to 3 decimal places.
n1 = 1.0003 x sin (angle 2)
sin (30)
Refractive index of the given unknown liquid = 0.500.
What is angle?
Angle is a geometric figure formed by two rays, called the sides of the angle, that have a common endpoint, called the vertex. An angle is measured in degrees, with a full circle representing 360°.
The refractive index of a material is a measure of how much light is bent when it enters the material from a medium with a different refractive index. When light enters a material with a higher refractive index, it bends towards the normal. The angle of refraction can be used to calculate the refractive index of a material. In this case, the unknown liquid’s refractive index is determined by measuring the angle of refraction.
The angle of refraction of the unknown liquid was 30 degrees, which was used to calculate the refractive index. Using the equation n1 = 1.0003 x sin (angle 2), the refractive index of the liquid was determined to be 0.50015, which was rounded to 3 decimal places to give a result of 0.500.
The refractive index of a material is an important measure of how light behaves when it interacts with a material. Knowing the refractive index of a material is important for applications such as computing the path of light through optical lenses or calculating the velocity of light in various materials, as well as for analyzing the behavior of materials such as metals, plastics and liquids.
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Worksheet 8.1 geometric mean just having a difficult time doing it
The lengths of the sides of the of the right triangles are found using the Pythagorean Theorem as follows;
ΔABN ~ ΔTBA ~ ΔTANx = 20x = 16x = 2·√7x = 15·√5124·√33·√(15)124·√(10))√(77)2·√55·√216·316x = 5·√3, y = 10·√3, z = 10x = 3·√3, y = 6, z = 6·√3x = 6·√5, y = 12, z = 12·√5GH = 2·√(46), HK = 2·√(174)The lake is 9 kilometers longWhat is the Pythagorean Theorem?Pythagorean Theorem states that the square of the length of the hypotenuse side of a right triangle is equivalent to the sum of the squares of the lengths of the legs of the right triangle.
1) The location of the angles and the congruent 90° angle and a second congruent angle indicates;
ΔABN ~ ΔTBA ~ ΔTAN
The missing values of x can be obtained using Pythagorean Theorem as follows;
2) AB = √(10² + 5²) = √(125) = 5·√5
[tex]\overline{AB}[/tex]² = (5 + x)² - [tex]\overline{AN}[/tex]²
[tex]\overline{AN}[/tex]² = (5 + x)² - [tex]\overline{AB}[/tex]²
[tex]\overline{AN}[/tex]² = 10² - x²
10² + x² = (5 + x)² - [tex]\overline{AB}[/tex]²
10² + x² = (5 + x)² - 125
[tex]\overline{AB}[/tex]² = (5 + x)² - (10² + x²) = 10·x - 75
10·x - 75 = (5·√5)² = 125
10·x - 75 = 125
10·x = 125 + 75 = 200
x = 200/10 = 20
x = 20
3) The hypotenuse side of the right triangle with sides 8 and 4 can be found as follows;
Length of the hypotenuse = √(8² + 4²) = 4·√5
Length of the leg of the larger right triangle is, length = √(8² + x²)
Therefore;
(x + 4)² = (8² + x²) + (4·√5)²
(x + 4)² - (8² + x²) = (4·√5)²
8·x - 48 = 80
8·x = 80 + 48 = 128
x = 128/8 = 16
x = 16
4) The leg of the larger right triangle = (12 + 2)² - x² = 14² - x²
14² - x² - 12² = x² - 2²
2·x² = 14² - 12² + 2² = 56
x² = 56/2 = 28
x = √(28) = 2·√7
x = 2·√7
5) The length of the shorter leg of the larger right triangle can be found as follows;
Length of the shorter leg = (20 + 25)²- x²
x² - 25² = (20 + 25)²- x² - 20²
2·x² = (20 + 25)² + 25² - 20² = 2250
x² = 2250/2 = 1125
x = √(1125) = 15·√5
x = 15·√5
6) x² - 4² = (32 + 4)² - x² - 32²
2·x² = (32 + 4)² + 4² - 32² = 288
x² = 288/2 = 144
x = √(144) = 12
x = 12
7) Let x represent the length of the right tringle and let h represent the altitude of the right triangle
(PR)² = 16² - x²
16² - x² - 12² = x² - 4²
2·x² = 16² - 12² + 4² = 128
x² = 128/2 = 64
x = √(64) = 8
The length of the short leg is; x = 8
Length of the longer leg, PR = √(16² - x²)
PR = √(16² - 8²) = 8·√3
Length of the longer leg = 8·√3
The square of the altitude = 16² - x² - 12²
Length of the altitude = √(16² - 64 - 12²) = 4·√3
8) Let x represent the length of the shorter leg, we get;
(PR)² = 18² - x²
The square of the altitude, (PS)² = 18² - x² - 15² = x² - 3²
2·x² = 18² - 15²+ 3² = 108
x² = 108/2 = 54
x = √(54) = 3·√6
Length of the shorter leg, x = 3·√6
PR = √(18² - 54) = 3·√(30)
Length of the longer leg, PR = 3·√(30)
Length of the altitude, PS = √(54 - 3²) = 3·√(15)
9) Let PQ = x, we get;
(QR)² = 30² - x²
30² - x² - (30 - 6)² = x² - 6²
2·x² = 30² - (30 - 6)² + 6² = 360
x² = 360/2 = 180
x = √(180) = 6·√5
PQ = x = 6·√5
(QR)² = 30² - 180 = 720
QR = √(720) = 12·√5
QS = √(720 - (30 - 6)²) = 12
The altitude, QS = 12
The geometric mean of 2 numbers is the square root of the product of the numbers;
10) The geometric mean of 5 and 8 = √(5 × 8) = 4·√10
11) 7 and 11
The geometric mean = √(7 × 11) = √(77)
12) 4 and 5
The geometric mean is; √(4 × 5) = 2·√5
13) 2 and 25
The geometric mean is; √(2 × 25) = √(50) = 5·√2
14) 6 and 8
The geometric mean is; √(6 × 8) = √(48) = 16·√3
15) 8 and 32
The geometric mean is; √(8 × 32) = 16
16) (15 + 5)² - y² = z²
15² + x² = y²
x² + 5² = z²
Therefore;
(15 + 5)² - 15² - x² = x² + 5²
2·x² = (15 + 5)² - 15² - 5² = 150
x² = 150/2 = 75
x = √(75) = 5·√3
x = 5·√3
z² = x² + 5²
z² = 75 + 25 = 100
z = √(100) = 10
z = 10
15² + x² = y²
15² + 75 = 300 = y²
y = √(300) = 10·√3
y = 10·√3
17) 12² - y² = z²
z² - 9² = x²
z² = 9² + x²
x² + 3² = y²
12² - x² - 3² = z²
12² - x² - 3² = 9² + x²
2·x² = 12² - 3² - 9² = 54
x² = 54/2 = 27
x = √(27) = 3·√3
x = 3·√3
z² = 9² + x²
z² = 9² + 27 = 108
z = 6·√3
x² + 3² = y²
y² = x² + 3²
y² = 27 + 3² = 36
y = √(36) = 6
y = 6
18) x² - 6² = y²
z² - 24² = y²
(6 + 24)² - x² = z²
Therefore; x² - 6² = z² - 24² = (6 + 24)² - x² - 24²
x² - 6² = (6 + 24)² - x² - 24² = 30² - x² - 24²
x² - 6² = 30² - x² - 24²
2·x² = 30² + 6² - 24² = 360
x² = 360/2 = 180
x = √(180) = 6·√(5)
x = 6·√(5)
z² = (6 + 24)² - x²
z² = (6 + 24)² - 180 = 720
z² = 720
z = √(720) = 12·√5
z = 12·√5
z² - 24² = y²
y² = 720 - 24² = 144
y² = 144
y = 12
19) Let x represent GH, we get;
32² - x² = (HK)²
32² - x² - (32 - 8)² = x² + 8²
2·x² = 32² - (32 - 8)² - 8² = 384
x² = 184
x = √(184) = 2·√(46)
GH = x = 2·√(46)
GH = 2·√(46)
(HK)² = (32 - 8)² + (x² - 8²)²
(HK)² = (32 - 8)² + (184 - 8²) = 696
HK = √(696) = 2·√(174)
HK = 2·√(174)
20) Let x represent the length of the lake, we get;
x² + 6² = (x + 4)² - (4² + 6²) = x² + 8·x - 36
x² + 6² = x² + 8·x - 36
8·x = 6² + 36 = 72
x = 72/8 = 9
The length of the lake, x = 9 km
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Pls asnwer
due in 10 mins
give simple working
Answer:
:-)
Step-by-step explanation:
Straight line=180 so 180-75-50=55
Since angles in a triangle=180 and since a=55 and c=50 b must =75
According to alternate angle theorem since angle next to a =50 angle c equals 50.
d=50 because the opposite angle theorem states that d=c and c=50
Answer this easy geometry question. And no links, please.
Answer:
x = 10
Step-by-step explanation:
Since KL is parallel to HI
m∠JKL = m∠JHI
m∠JLK = m∠LIH
For the two triangles JKL and JHI, we have the common angle J and two angles equal to the corresponding two angles
Therefore the triangles are similar
Ratio of the sides to the corresponding sides must be equal
Hence
[tex]\dfrac{JH}{JK} = \dfrac{JI}{JL}\\[/tex]
JH = JK + KH = 28 + 20 = 48
JI = JL + JL = 14 + x
Therefore
[tex]\dfrac{JH}{JK} = \dfrac{JI}{JL}\\\\= > \dfrac{48}{28} = \dfrac{14 + x}{14}[/tex]
[tex]\dfrac{48}{28} = \dfrac{12}{7}[/tex] by dividing numerator and denominator by 4
Hence
[tex]\dfrac{48}{28} = \dfrac{14 + x}{14}\\\\\rightarrow \quad \dfrac{12}{7} = \dfrac{14 + x}{14}\\\\[/tex]
Multiply both sides by 14:
[tex]14 \cdot \dfrac{12}{7} = 14 \cdot \dfrac{14 + x}{14}\\\\2 \cdot 12 = 14 + x\\\\24 = 14 + x\\\\\text{Subtract 14 both sides:}\\\\24 - 14 = x\\\\or\\\\x = 10\\\\[/tex]
(URGENT) PLEASE PLEASE ANSWER THE QUESTION I WILL GIVE YOU THE BRAINLIEST PLEASE ANSWER THE QUESTION.
Chose one of two tables below to create your own Question (with solution).
A. If a friend's kid has no curfew, what is the probability that they don't have chores? B. the probability that a friend's kid doesn't have chores given that they have no curfew is 1/3. C. I chose this question because it involves calculating a conditional probability based on a given set of data.
Describe Probability?Probability can also be used to describe more complex events, such as the likelihood of a stock price increasing by a certain amount in a given period of time, or the probability of a medical treatment being effective for a certain disease.
My Conditional Frequency Question is:
If a friend's kid has no curfew, what is the probability that they don't have chores?
Solution:
The conditional probability of a kid not having chores given that they have no curfew can be found using the formula:
P(No Chores | No Curfew) = P(No Chores and No Curfew) / P(No Curfew)
From the table, we can see that the number of kids who have no curfew and no chores is 2, and the total number of kids who have no curfew is 6. Therefore:
P(No Chores | No Curfew) = 2/6 = 1/3
So the probability that a friend's kid doesn't have chores given that they have no curfew is 1/3.
I chose this question because it involves calculating a conditional probability based on a given set of data. This is a common type of question in statistics and probability, and it requires an understanding of the basic concepts of probability such as conditional probability and independence. The table provided gives us the data we need to calculate the conditional probability, and the solution involves applying the formula for conditional probability and simplifying the fraction.
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x = 35, x2 = 250, n= 5 then standard deviation of distribution is a. 1 b. 99 c. 3.1254 d. 9.9498
The correct answer is d. 9.9498.
To find the standard deviation of a distribution, we use the formula:
Standard deviation = √[(∑(x - mean)2)/n]
First, we need to find the mean of the distribution. The mean is the sum of all the values divided by the number of values. In this case, the mean is:
mean = (35 + 250)/5 = 57
Next, we need to find the sum of the squared differences between each value and the mean. This is:
∑(x - mean)2 = (35 - 57)2 + (250 - 57)2 = 485 + 37249 = 37734
Finally, we divide this sum by the number of values and take the square root to get the standard deviation:
Standard deviation = √(37734/5) = √7546.8 = 9.9498
So the standard deviation of the distribution is 9.9498.
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A garden contains 135 flowers, each of which is either red or yellow.
There are 3 beds of yellow flowers and 3 beds of red flowers. There are
30 yellow flowers in each yellow flower bed.
PART A
If r represents the number of red flowers in each
red flower bed, what equation could you use to
represent the number of red and yellow flowers?
Answer:
Let's use the variable "r" to represent the number of red flowers in each red flower bed.
Then, the total number of red flowers in the garden would be 3r, since there are 3 beds of red flowers.
Similarly, the total number of yellow flowers in the garden would be 3 * 30 = 90, since there are 3 beds of yellow flowers, and 30 flowers in each bed.
So the total number of flowers in the garden is the sum of the red and yellow flowers:
Total number of flowers = 3r + 90
Since there are 135 flowers in the garden, we can set the equation equal to 135 and solve for "r":
3r + 90 = 135
3r = 45
r = 15
Therefore, there are 15 red flowers in each red flower bed, and the total number of red flowers in the garden is 3r = 45. The equation representing the number of red and yellow flowers is:
Total number of flowers = 3r + 90 = 3(15) + 90 = 45 + 90 = 135.
So this equation checks out, as we expect the total number of flowers to be 135.
The marbles kids museum plans to host an event that requires hargett st. To be closed between blount street and person st for a day. Explain whether or not this closure is feasible given the traffic flows described in your model
It is feasible to close Hargett St. between Blount Street and Person Street for a day.
Given the traffic flow model described, it is feasible to close Hargett St. between Blount Street and Person Street for a day. The model states that the average daily traffic flow on Hargett St. is 8,000 vehicles per day, with 3,000 vehicles per hour during peak hours. By closing Hargett St. between Blount Street and Person Street for a day, the average daily traffic flow would be reduced by 8,000 vehicles per day. Thus, the total number of vehicles that would be diverted from Hargett St. on the day of the event would be 8,000 vehicles. This amount of traffic would not be too overwhelming for the surrounding streets to handle, since the model states that the average daily traffic flow for those streets is approximately 4,000 vehicles per day.
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10 A home improvement store advertises 60 square feet of flooring for $287. 00 including an
480. 00 installation fee. Write an equation to represent the cost of one square foot of flooring. What is the equation.
The equation which represents the cost of one square foot of flooring is x = $3.45.
Let the cost of one square foot of flooring be = x,
We know that the store is selling 60 square feet of flooring for $287, which includes a $80 installation fee.
So, the cost of 60 square feet of flooring is
⇒ $287.00 - $80.00 = $207
To find the cost of one square foot of flooring, we divide the cost of 60 square feet by 60,
Which is,
⇒ $207/60 = $3.45
Therefore, the cost of one square foot of flooring is represented by the equation x=$3.45.
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The given question is incomplete, the complete question is
A home improvement store advertises 60 square feet of flooring for $287.00 including a $80 installation fee. Write an equation to represent the cost of one square foot of flooring.
Find a polynomial function with the following properties: It has a triple zero at x = 1, double zero at x = 3, and has a y-intercept (0.27)
This confirms that our polynomial function has the correct y-intercept.
To find a polynomial function with the given properties, we can use the fact that the zeros of a polynomial function are the values of x that make the function equal to zero. The multiplicity of a zero is the number of times that zero appears as a factor in the polynomial.
Since we are given a triple zero at x = 1, this means that (x - 1)^3 is a factor of the polynomial. Similarly, since we are given a double zero at x = 3, this means that (x - 3)^2 is a factor of the polynomial.
To find the y-intercept, we can set x = 0 and solve for y. Since the y-intercept is given as (0, 27), this means that the constant term of the polynomial is 27.
Putting all of this information together, we can write the polynomial function as:
f(x) = 27(x - 1)^3(x - 3)^2
This is a polynomial function that satisfies the given properties. It has a triple zero at x = 1, a double zero at x = 3, and a y-intercept of (0, 27).
We can check our answer by plugging in the values of x and seeing if the function equals zero:
f(1) = 27(1 - 1)^3(1 - 3)^2 = 0
f(3) = 27(3 - 1)^3(3 - 3)^2 = 0
Both of these values equal zero, which confirms that our polynomial function has the correct zeros. Additionally, when we plug in x = 0, we get:
f(0) = 27(0 - 1)^3(0 - 3)^2 = 27
This confirms that our polynomial function has the correct y-intercept.
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a catapult is trying to destroy a 40 foot wall that is 120 feet away from it by firing rocks at it the rock launches out of the catapult reaching its maximum height of 50 feet 75 feet away from the catapult the rock then comes down from the maximum height to smash the wall 8 feet from the top a write an equation that models the pathology of the rock
To model the path of the rock, we can use a quadratic equation of the form y = ax^2 + bx + c, where y is the height of the rock, x is the distance from the catapult, and a, b, and c are constants.
We can use the given information to find the values of a, b, and c.
First, we know that the rock launches out of the catapult at a height of 0 feet, so when x = 0, y = 0. This means that c = 0.
Next, we know that the rock reaches its maximum height of 50 feet when it is 75 feet away from the catapult, so when x = 75, y = 50. We can plug these values into the equation and simplify:
50 = a(75)^2 + b(75) + 0
50 = 5625a + 75b
Finally, we know that the rock hits the wall 8 feet from the top when it is 120 feet away from the catapult, so when
x = 120, y = 40 - 8 = 32. We can plug these values into the equation and simplify:
32 = a(120)^2 + b(120) + 0
32 = 14400a + 120b
We now have a system of two equations with two unknowns:
5625a + 75b = 50
14400a + 120b = 32
We can use substitution or elimination to solve for a and b. Using elimination, we can multiply the first equation by -1.6 to eliminate the b term:
-9000a - 120b = -80
14400a + 120b = 32
Adding the two equations together gives:
5400a = -48
Solving for a gives:
a = -48/5400 = -0.00888888889
We can then plug this value of a back into one of the original equations to solve for b:
5625(-0.00888888889) + 75b = 50
-50 + 75b = 50
75b = 100
b = 100/75 = 1.33333333333
So the equation that models the path of the rock is:
y = -0.00888888889x^2 + 1.33333333333x + 0
Or, rounding to three decimal places:
y = -0.009x^2 + 1.333x
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brian needs to bake 6 batches of cookies eatch batch calls for 3/4 teaspoons of vanilla how much vanilla will he need altogether
Answer:
4.5 teaspoons of vanilla
Step-by-step explanation:
We can do this by multiplying:
3/4*(6)
18/4
9/2
4.5 teaspoons of vanilla
59 points
Use the table below to calculate the average percent change in population in California from 2000-2009.
If California's population in 2009 was 37,000,000 and the population trend were to continue, what would the population be in the year 2015?
How do you find the scale factors with fractions
To find the scale factors with fractions, you first need to understand what scale factors are. Scale factors are the ratios of corresponding lengths in two similar figures. They tell you how much larger or smaller one figure is compared to another.
To simplify fractions, you need to find the greatest common factor (GCF) of the numerator and denominator and divide them by it.
For example, if we have the fraction 6/12, we can simplify it by finding the GCF of 6 and 12, which is 6. Then, we divide both the numerator and denominator by 6:
6/12 = (6 ÷ 6) / (12 ÷ 6) = 1/2
So, 6/12 simplifies to 1/2.
If the fraction is already in its simplest form, then there is no need to simplify it further.
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The complete question i:
How do you find the scale factors with fractions? Give example.
Susie and Jenny are 25 miles apart. Susie sights a hot-air balloon at a 30 degree angle of elevation east of where she is standing. Jenny sights the same hot-air balloon at a 40 degree angle of elevation west of where she is standing. How far is the balloon from Jenny? (Round to the nearest thousandth.)
The distance of the hot-air balloon from Jenny is approximately 12.500 miles
To find the distance of the hot-air balloon from Jenny, we can use the Law of Sines. The Law of Sines states that the ratio of the length of a side of a triangle to the sine of the angle opposite that side is the same for all sides and angles in the triangle. In this case, the triangle is formed by Susie, Jenny, and the hot-air balloon.
Let the distance from Susie to the hot-air balloon be x, and the distance from Jenny to the hot-air balloon be y. Using the Law of Sines, we can write the following equation:
(x/sin(40)) = (y/sin(30)) = (25/sin(110))
Now, we can cross multiply and solve for y:
(y)(sin(110)) = (25)(sin(30))
y = (25)(sin(30))/(sin(110))
y = 12.500
Therefore, the distance of the hot-air balloon from Jenny is approximately 12.500 miles.
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Find the area of the figure.
Answer:
76 ft²
Step-by-step explanation:
You want the area of a trapezoid with bases 6 ft and 13 ft, and height 8 ft.
TrapezoidThe area formula for a trapezoid is ...
A = 1/2(b1 +b2)h
A = 1/2(6 ft +13 ft)(8 ft) = 76 ft²
The area of the figure is 76 square feet.
__
Additional comment
The length of the longer base on the right is the sum of 6 ft and 7 ft. It is 13 ft.
The area of the figure is 76 square feet.
the area of a trapezoid is: 76 ft².
Here, we have,
from the given figure, we get,
The length of the longer base on the right is the sum of 6 ft and 7 ft. It is 13 ft.
We have to find the area of a trapezoid with bases 6 ft and 13 ft, and height 8 ft.
Trapezoid
The area formula for a trapezoid is
A = 1/2(b₁ +b₂)h
A = 1/2(6 ft +13 ft)(8 ft)
= 76 ft²
so, we get,
The area of the figure is 76 square feet.
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in the diagram what is the measure of angle one to the nearest degree
Answer: D
Step-by-step explanation:
7x + 4 = 88
x = 12
angle 1 = 180 - 7(12) + 2
angle 1 = 98
So it's D
Answer: The angle measure for angle 1 would be 98 degrees.
Step-by-step explanation: First, you set 88 equal to (7x+4) since they are vertical angles. (Vertical angles are congruent.) Then you solve and find that x=12. You then plug 12 in to the second equation, (7x-2) and get 82. Since angle 1 is supplementary to the angle that measures 82 degrees, you would take 180-82= Angle 1.
Bookwork code: 597
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The cylinder below has a curved surface area of 408 m² and a length of 17 m
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Work out the total surface area of the cylinder.
Give your answer to 3 s.f.
curved surface area = 408m m²
17 m
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Answer >
The total surface area of the cylinder is 548.13 square meters.
How to calculate curved surface area?The curved surface area of a cylinder can be calculated using the formula:
CSA = 2πrh
where CSA is the curved surface area, r is the radius, and h is the height or length of the cylinder.
We are given that the curved surface area of the cylinder is 408 m² and the length is 17 m.
We can use this information to solve for the radius:
CSA = 2πrh
408 = 2πr(17)
r = 408 / (2π × 17)
r ≈ 3.00 m (rounded to 2 decimal places)
Now that we know the radius, we can calculate the total surface area of the cylinder by adding the areas of the two bases and the curved surface area:
Total surface area = 2πr² + 2πrh
Total surface area = 2π(3.00)² + 2π(3.00)(17)
Total surface area ≈ 226.19 + 321.94
Total surface area ≈ 548.13
Therefore, the total surface area of the cylinder is approximately 548.13 square meters.
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Question 11 Exercise. Suppose P(x) is a polynomial presented as a product: P(x)=(2x+5)(5x-2)^(2)(x+7)Q(x) where Q(x) is an unspecified polynomial of degree 6 . What is the degree of P(x) ?
The final answer is degree of P(x) is 10.
The degree of a polynomial is the highest power of x that appears in the polynomial.
In the case of P(x), we can find the degree by multiplying the degrees of each factor together.
The degree of (2x+5) is 1,
the degree of (5x-2)^(2) is 2,
the degree of (x+7) is 1,
and the degree of Q(x) is 6.
Therefore, the degree of P(x) is 1*2*1*6 = 12.
However, we need to subtract 2 from the degree because (5x-2)^(2) is raised to the power of 2.
So the degree of P(x) is 12-2 = 10.
Therefore, the degree of P(x) is 10.
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katrin road cyclr6½ km in morning and 8¾ in eveving find distance travelled by he all together on the same day
Hi! So i have no clue how to do similar figures. I am in 8th grade math, and am doing similar figures, but don't how. I have a few examples. A rectangular garden is 45 ft wide and 70 ft long. On a blueprint, the width is 9 in. Identify the length on the blueprint. Possible answers:
7 in
9 in
12 in
14 in
The question is in the screenshot:
The value of the trigonometric function sin A, tan A, and sec A will be 3/5, 3/4, and 5/4.
What is a right-angle triangle?It's a form of a triangle with one 90-degree angle that follows Pythagoras' theorem and can be solved using the trigonometry function.
Use the triangle to evaluate each function.
Hypotenuse AB has a length of 5, BC has a length of 4, and side AC has a length of 3.
Then the value of the trigonometric function will be
sin A = BC / AB
sin A = 3 / 5
tan A = BC / AC
tan A = 3 / 4
sec A = AB / AC
sec A = 5 / 4
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20% tip, 8% tax sales, total is $23. 04, what is the pretax price?
The pretax price of the item is $18. The tip is $3.60 (0.20 * 18) and the tax is $1.44 (0.08 * 18), which when added to $18 gives us a total cost of $23.04.
For a 20% tip, 8% tax sales. Total $23. 04, we can say that The pre-tax cost is $19.20.
Let x be the pre-tax cost of the sales. Then we can set up the equation:
x + 0.20x + 0.08x = 23.04
Simplifying and solving for x, we get:
1.28x = 23.04
x = 23.04 / 1.28
x = 18
The pretax price is the amount charged for a product or service before any taxes are added. It is the price that a customer would pay for a product or service without any additional charges imposed by the government. In most countries, taxes such as sales tax, value-added tax (VAT), or goods and services tax (GST) are added to the pretax price to determine the final price that a customer pays.
Pretax prices are important for businesses to determine their profit margins and pricing strategies. It is also useful for customers to compare prices between different products or services before taxes are added. However, it is important to note that the final price paid by the customer may vary based on the applicable tax rate.
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Complete Question: -
Need help on math You have a meal at a restaurant. The sale tax is 8% . You leave a tip for the waitress that is 20% of the pretax price . You spend $23.04 . What is the pretax price of the meal?
HELP PLS BRAINLIEST AND FIVE STAR IF YOU GET TWO OF THESE ARE CORRECT
a)√(x^2-14x+49)=x-7
b)√(4x^2-20x+25)=5-2x
(also the answer is most likely NOT all real numbers or no solutions)
NEED HELP DUE FRIDAY!!!!!!!!!
If the coordinates of point I are (9, 12), what is the value of cos(G), sin(G), and tan(G) for triangle GHI? Explain your reasoning.
Answer:
cos G = 3/5
sin G = 4/5
tan G = 4/3
Step-by-step explanation:
I(9, 12)
GH = 9
HI = 12
(GI)² = 9² + 12²
GI = 15
For <G:
opp = HI = 12
adj = GH = 9
hyp = GI = 15
cos G = adj/hyp = 9/15 = 3/5
sin G = opp/hyp = 12/15 = 4/5
tan G = opp/adj = 12/9 = 4/3
Step-by-step explanation:
remember the triangle in a circle, when you learned about sine, cosine and the other trigonometric functions ?
this looked the same way, just that the circle was the norm-circle with radius 1.
here, now, the radius is larger, so every function line is also multiplied by the actual radius.
but the principles are the same.
sine is the up/down leg of the right-angled triangle.
cosine is the left/right leg.
tangent is sine/cosine.
I = (9, 12)
so, Pythagoras gives us the radius (line GI) :
GI² = GH² + HI² = 9² + 12² = 81 + 144 = 225
GI = sqrt(225) = 15
sin(G) × GI = HI
sin(G) × 15 = 12
sin(G) = 12/15 = 4/5 = 0.8
cos(G) × GI = GH
cos(G) × 15 = 9
cos(G) = 9/15 = 3/5 = 0.6
tan(G) = sin(G)/cos(G) = 4/5 / 3/5 = (4×5)/(5×3) =
= 4/3 = 1.333333333...
For which two functions does f(x)→+∞ as x→+∞ ? Explain your reasoning.
f(x)=1/4x+3
g(x)=−3/5x−8
h(x)=2x−1
The two functions with the end behavior x→+∞ , f(x) →+∞ are:
f(x) = (1/4)*x + 3
h(x) = 2x - 1
For which function the end behavior is f(x)→+∞ as x→+∞ ?The end behavior of a function studies how the function behaves as x tends to infinity or negative infinity.
The function will tend to positive infinity as x tends to positive infinity if the function increases for x > 0.
Then we need to identifty which of these two functions are increasing, the two increasing ones are:
f(x) = (1/4)*x + 3
h(x) = 2x - 1
These two are linear equations with positive solpes, so these are increasing functions, and as x→+∞ , f(x) →+∞
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Question 15 Solve the compound inequality and give your answer in interval notation. 8x+7>55 OR -5x-1>=-26 Submit Question
To solve the compound inequality, we need to solve each inequality separately and then combine the solutions using the word "OR."
For the first inequality, 8x+7>55, we can isolate the variable on one side of the inequality by subtracting 7 from both sides:
8x > 48
Next, we can divide both sides by 8 to solve for x:
x > 6
For the second inequality, -5x-1>=-26, we can isolate the variable on one side of the inequality by adding 1 to both sides:
-5x >= -25
Next, we can divide both sides by -5 to solve for x. Remember that when we divide or multiply both sides of an inequality by a negative number, we need to reverse the inequality sign:
x <= 5
Now we can combine the solutions using the word "OR." In interval notation, this would be (-∞, 5] U (6, ∞). This means that the solution includes all values of x less than or equal to 5 or greater than 6.
So the final answer is:
x ∈ (-∞, 5] U (6, ∞)
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