Answer:
Perimeter:[tex]4x+10[/tex] feet
Area:[tex]x^{2}+5x+6[/tex] feet
Step-by-step explanation:
The perimeter is equal to 2*width +2*length. The width is x+2 and the length is x+3, therefore the perimeter is equal to 2x+4+2x+6 which equals 4x+10.
The area is equal to width*length
(x+3)(x+2)=[tex]x^{2}+2x+3x+6=x^{2}+5x+6[/tex]
Find the slope and intercept of line. y=5/4x
Answer:
m = 5/4
Y-intercept: (0,0)
Step-by-step explanation:
The equation is in slope-intercept form y = mx + b
m = the slope
b = y-intercept
Our equation y = 5/4x
m = 5/4
Y-intercept is located at (0,0)
Answer:
the slope is 5/4 and the y-intercept is 0
Step-by-step explanation:
The slope is the number before x.
slope is 5/4The y intercept is the constant term in the equation.
y intercept is 0Info related to the question
The equation I just worked with was given in slope intercept form :
y = mx + bWhere the slope is defined as m and the intercept is defined as b.
En el negocio familiar los hermanos Jaziel Elisa y Sofía deben ayudar a atender así el acude cada cuatro días Elisa cada cinco días y Sofía que a las seis si los tres han coincidido el 4 de marzo después de cuantos días se volverán a coincidir
Based on the LCM, Jaziel, Elisa, and Sofía will coincide again after 60 days.
How to calculate the valueFrom the information, in the family business, the siblings Jaziel Elisa and Sofía must help take care of it, so he comes every four days, Elisa every five days and Sofía that at six o'clock.
In order to determine when Jaziel, Elisa, and Sofía will coincide again, we need to find the least common multiple (LCM) of their visit intervals.
The intervals for Jaziel, Elisa, and Sofía are 4 days, 5 days, and 6 days, respectively. We need to find the smallest number that is divisible by all three of these intervals.
The LCM of 4, 5, and 6 is 60. Therefore, Jaziel, Elisa, and Sofía will coincide again after 60 days.
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In the family business, the siblings Jaziel Elisa and Sofía must help take care of it, so he comes every four days, Elisa every five days and Sofía that at six o'clock if the three have coincided on March 4 after how many days will they coincide again
a food truck sells two types of meals: a burrito bowl for $3 and a salad for $6. Yesterday, the food truck sold a total of 100 meals for a total of $396 Write the equations to find the number of burrito bowls and salads sold. Let x be the number of burrito bowls sold and y be the number of salads sold. Do not solve
Answer: The pair of equations required this the given question is x+y=100 and 3x+6y=396
Step-by-step explanation:
If x denotes the number of burritos and y denotes the number of salads sold. then,
1. x+y =100 (as there are a total of 100 meals sold)
2. 3x+6y=396(as the cost of each burrito is $3 and cost of each salad is $6, the total cost of the meal is $396)
Hence, The pair of equations required this the given question is x+y=100 and 3x+6y=396
In the country of United States of Heightlandia, the height measurements of ten-year-old children are approximately normally distributed with a mean of 55.7 inches, and standard deviation of 2.6 inches.
What is the probability that the height of a randomly chosen child is between 52.2 and 60.6 inches? Do not round until you get your your final answer, and then round to 3 decimal places.
Answer=
(Round your answer to 3 decimal places.)
Answer: Therefore, the probability that the height of a randomly chosen child is between 52.2 and 60.6 inches is 0.884. Rounded to 3 decimal places, the answer is 0.884.
Step-by-step explanation:We can use the standard normal distribution to find the probability that the height of a randomly chosen child is between 52.2 and 60.6 inches.
First, we need to standardize the values using the formula:
z = (x - mu) / sigma
where:
x = 52.2 and 60.6 (the values we want to find the probability between)
mu = 55.7 (the mean)
sigma = 2.6 (the standard deviation)
For x = 52.2:
z = (52.2 - 55.7) / 2.6 = -1.346
For x = 60.6:
z = (60.6 - 55.7) / 2.6 = 1.885
Next, we use a standard normal distribution table or calculator to find the area between these two z-scores:
P(-1.346 < z < 1.885) = 0.884
Therefore, the probability that the height of a randomly chosen child is between 52.2 and 60.6 inches is 0.884. Rounded to 3 decimal places, the answer is 0.884.
ABCD is a rhombus with A(-3; 8) and C(5 ; -4). The diagonals of ABCD bisect each other at M. The point E(6; 1) lies on BC. 3.1 3.2 3.3 3.4 A(-3; 8) P D 0 O M TR S B E(6; 1) C(5 ; - 4) Calculate the coordinates of M. Calculate the gradient of BC. Determine the equation of the line AD in the form y = mx + c. Determine the size of 0, that is BAC. Show ALL calculations. T (2 (2 (3 [13
The coordinates of point M are (1, 2).
The gradient of CB is 5.
The equation of line AD in the form y = mx + c is: y = (-1/5)x + 37/5.
To solve the given problem, we can follow these steps:
1. Calculate the coordinates of point M:
Since the diagonals of a rhombus bisect each other, the midpoint of the diagonal AC will give us the coordinates of point M.
Midpoint formula:
x-coordinate of M = (x-coordinate of A + x-coordinate of C) / 2
= (-3 + 5) / 2
= 2 / 2
= 1
y-coordinate of M = (y-coordinate of A + y-coordinate of C) / 2
= (8 - 4) / 2
= 4 / 2
= 2
Therefore, the coordinates of point M are (1, 2).
2. The gradient (slope) of a line passing through two points (x₁, y₁) and (x₂, y₂) can be found using the formula:
Gradient (m) = (-4 - 1) / (5 - 6)
= -5 / -1
= 5
Therefore, the gradient of CB is 5.
3. To find the equation of line AD, we need to calculate the gradient (m) of AD and the y-intercept (c).
Gradient of CB = 5
Gradient of AD = -1/5 (negative reciprocal of 5)
To find the y-intercept (c), we can substitute the coordinates of point A (-3, 8) into the equation y = mx + c and solve for c:
8 = (-1/5)(-3) + c
8 = 3/5 + c
c = 8 - 3/5
c = 40/5 - 3/5
c = 37/5
Therefore, the equation of line AD in the form y = mx + c is:
y = (-1/5)x + 37/5.
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Suppose that the mean daily viewing time of television is 8.35 hours. Use a normal probability distribution with a standard deviation of 2.5 hours to answer the following questions about daily television viewing per household
(a)
What is the probability that a household views television between 3 and 11 hours a day? (Round your answer to four decimal places.)
(b)
How many hours of television viewing must a household have in order to be in the top 3% of all television viewing households? (Round your answer to two decimal places.)
hrs
(c)
What is the probability that a household views television more than 5 hours a day? (Round your answer to four decimal places.)
Answer:
(a) To find the probability that a household views television between 3 and 11 hours a day, we need to calculate the z-scores for 3 and 11 hours using the formula z = (x - μ) / σ, where μ is the mean and σ is the standard deviation. The z-score for 3 hours is (3 - 8.35) / 2.5 = -2.14 and the z-score for 11 hours is (11 - 8.35) / 2.5 = 1.06. Using a standard normal distribution table, we find that the probability of a z-score being between -2.14 and 1.06 is approximately 0.8209.
(b) To find how many hours of television viewing a household must have in order to be in the top 3% of all television viewing households, we need to find the z-score that corresponds to the top 3% of the standard normal distribution. Using a standard normal distribution table, we find that this z-score is approximately 1.88. Using the formula x = μ + zσ, we can calculate that a household must view television for approximately 8.35 + (1.88 * 2.5) = 12.75 hours to be in the top 3% of all television viewing households.
(c) To find the probability that a household views television more than 5 hours a day, we need to calculate the z-score for 5 hours using the formula z = (x - μ) / σ, where μ is the mean and σ is the standard deviation. The z-score for 5 hours is (5 - 8.35) / 2.5 = -1.34. Using a standard normal distribution table, we find that the probability of a z-score being greater than -1.34 is approximately 0.9099.
Answer:
Step-by-step explanation:
The mean daily viewing time of television is 8.35 hours and the standard deviation is 2.5 hours. We can use a normal probability distribution to answer the following questions about daily television viewing per household:
(a) The probability that a household views television between 3 and 11 hours a day is 0.9772 (rounded to four decimal places).
(b) To be in the top 3% of all television viewing households, a household must have 15.68 hours of television viewing per day (rounded to two decimal places).
The probability that a household views television more than 5 hours a day is 0.8944 (rounded to four decimal places).
I hope this helps! Let me know if you have any other questions.
Which angle or angles are supplementary to ∠EOF?
Giving brainliest
A. ∠AOB and ∠DOE
B. ∠BOC and ∠EOF
C. ∠COD and ∠AOF
D. ∠FOB and ∠COE
The angles supplementary to ∠EOF are ∠FOB and ∠COE.
What is supplementary angles?Supplementary angles are those angles that sum up to 180 degrees. In
other words, two angles are called supplementary when their measures
add up to 180 degrees.
Therefore, let's find the angles that are supplementary angles to ∠EOF.
Therefore, let's use the angle relationships in the line intersection to find
the angles that are supplementary to ∠EOF.
Hence, the angles supplementary to ∠EOF are ∠FOB and ∠COE
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Help Quickly! Name all the chords.
Giving brainliest
A. OR, OU, OT, TR
B. TR
C. UT,RU, SR, TS, TR
D. UT, RU, SR, TS
Answer:
C.
Step-by-step explanation:
A chord has two endpoints on the circle. A diameter is a special chord bc it also goes through the center.
RT is the diameter and the rest of answer A are radii (plural of radius)
answer B is a chord, the diameter, but thats not the only chord.
answer D are chords but they forgot RT.
So, C. is the best answer.
The graph below shows the solution to which system of inequalities?
Which is an exponential function with a y-intercept of (0, 4)?
Help please
Answer:
D) y = 2ˣ + 3-----------------
The y-intercept of (0, 4) means the function has a value of 4 when x = 0.
Verify it with given functions:
A) y = 3x + 1
x = 0 ⇒ y = 3*0 + 1 = 1 ≠ 4, NoB) y = 4ˣ
x = 0 ⇒ y = 4⁰ = 1 ≠ 4, NoC) y = 1ˣ
x = 0 ⇒ y = 1⁰ = 1 ≠ 4, NoD) y = 2ˣ + 3
x = 0 ⇒ y = 2⁰ + 3 = 1 + 3 = 4, YesFind the area bounded by the two functions f (x) = sin(2x) + 1 and g(x) = cos(x) − 2 on the
interval [0, 2π]. (do the 2 functions even intersect plesse help - the last person gave me the wrong answer)
Answer:
The area bounded by the two functions f(x) and g(x) on the interval [0, 2π] is 6π.
Step-by-step explanation:
The range of y = sin(2x) is [-1, 1].
As function f(x) = sin(2x) + 1 has been translated 1 unit up, the range of f(x) is [0, 2].
The range of y = cos(x) is [-1, 1].
As function g(x) = cos(x) - 2 has been translated 2 units down, the range of g(x) is [-3, -1].
As ranges of the functions do not overlap, the two functions do not intersect.
As the curve of f(x) is above the x-axis, and the curve of g(x) is below the x-axis, we can integrate to find the area between the curve and the x-axis for each function in the given interval, then add them together.
Note: As g(x) is below the x-axis, the evaluation of the integral will return a negative area. Therefore, we need to negate the integral so we have a positive area (since area cannot be negative).
Area between f(x) and the x-axis[tex]\begin{aligned}A_1=\displaystyle \int^{2\pi}_{0} (\sin(2x)+1)\; \text{d}x&=\left[-\dfrac{1}{2}\cos(2x)+x \right]^{2\pi}_{0}\\\\&=\left(-\dfrac{1}{2}\cos(2(2\pi))+2\pi\right)-\left(-\dfrac{1}{2}\cos(2(0))+0\right)\\\\&=\left(-\dfrac{1}{2}+2\pi\right)-\left(-\dfrac{1}{2}\right)\\\\&=2\pi\end{aligned}[/tex]
Area between g(x) and the x-axisAs the curve is below the x-axis, remember that we need to negate the integral to find the area.
[tex]\begin{aligned}A_2=-\displaystyle \int^{2\pi}_{0} (\cos(x)-2)\; \text{d}x&=-\left[\vphantom{\dfrac12}\sin(x)-2x \right]^{2\pi}_{0}\\\\&=-\left[(\sin(2\pi)-2(2\pi))-(\sin(0)-2(0))\right]\\\\&=-\left[(0-4\pi)-(0-0)\right]\\\\&=-\left[-4\pi\right]\\\\&=4\pi\end{aligned}[/tex]
Area bounded by the two functions[tex]\begin{aligned}A_1+A_2&=2\pi+4\pi\\&=6\pi\end{aligned}[/tex]
Therefore, the area bounded by the two functions f(x) and g(x) on the interval [0, 2π] is 6π.
A card is drawn from a standard deck of cards. What is the probability of drawing a 6 or a king?
Answer:
2/13
Step-by-step explanation:
To find the probability of drawing a 6 or a king from a standard deck of cards, we need to determine the number of favorable outcomes (cards that are either a 6 or a king) and the total number of possible outcomes (total number of cards in the deck).
There are 4 kings in a standard deck (one king in each suit: hearts, diamonds, clubs, and spades) and 4 6s (one 6 in each suit).
Total number of favorable outcomes = 4 (4 kings) + 4 (4 6s) = 8
Total number of possible outcomes = 52 (total number of cards in the deck)
Therefore, the probability of drawing a 6 or a king is:
Probability = Number of favorable outcomes / Total number of possible outcomes
= 8 / 52
= 2 / 13
So, the probability of drawing a 6 or a king from a standard deck of cards is 2/13.
Brynen is driving to a new job five days this week. He drives 27 miles each way. His car gets 35 miles per gallon of gas. How many gallons of gas will he use driving to and from work this week? Round to the nearest tenth.
Brynen will use 7.71 gallons of gas driving to and from work this week.
To calculate the gallons of gas Brynen will use driving to and from work this week, we need to consider the round trip distance and the car's fuel efficiency.
Given:
Brynen drives 27 miles each way to work.
His car gets 35 miles per gallon of gas.
To find the total distance Brynen will travel in a week, we need to calculate the round trip distance for each workday and multiply it by the number of workdays (five days).
Round trip distance = 27 miles (one-way distance) * 2 = 54 miles (round trip distance)
Total distance traveled in a week = 54 miles (round trip distance) * 5 days = 270 miles
Next, we can determine the total gallons of gas Brynen will use using his car's fuel efficiency.
Gallons of gas used = Total distance / Fuel efficiency
Gallons of gas used = 270 miles / 35 miles per gallon
Gallons of gas used ≈ 7.71 gallons (rounded to the nearest tenth)
Therefore, Brynen will use approximately 7.71 gallons of gas driving to and from work this week.
It's important to note that this calculation assumes that Brynen's car maintains a consistent fuel efficiency of 35 miles per gallon throughout the entire week and that no additional driving outside of the work commute is considered. Factors such as traffic, variations in fuel efficiency, or additional trips would affect the actual gas consumption.
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Suppose we are minimizing the objective function value of a linear program. The feasible region is defined by 5 corner points. The objective function values at the five corner points are 4, 11, 7, 4, and 10. What type of solution do we have for this problem?.
The linear program shows that there are different attainable arrangements that accomplish the same ideal objective function value..
How to determine the solution to the objective function value of a linear programBased on the given data, since the objective function values at the five corner points are diverse, able to conclude that there's no one-of-a-kind ideal arrangement for this linear program.
The reality that there are numerous distinctive objective function values at the corner points suggests that there are numerous ideal arrangements or that the objective work isn't maximized or minimized at any of the corner points.
In this case, the linear program may have numerous ideal arrangements, showing that there are different attainable arrangements that accomplish the same ideal objective function value.
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Which statements about the graph of y = tan x are true?
The statement about the graph of y = tan x that is true is A The period is 2pi.
How to explain the informationIn the graph of y = tan x, the function has vertical asymptotes at x = (2n + 1)π/2, where n is an integer. At these points, the value of cos x becomes zero, causing the tangent function to approach positive or negative infinity.
The period of a function is the smallest positive number such that the graph of the function repeats itself after being shifted that number of units to the right or left. In the case of y=tanx, the graph repeats itself after being shifted π units to the right.
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Which statement about the graph of y = tan x is true?
A The period is 2pi.
B The function has horizontal asymptotes whenever cos x = 0.
C The function has zeros whenever csc x = 0.
D The function is increasing everywhere in its domain
Identify the new coordinates of polygon
ABCD after a translation of 2 units down
and 3 units right.
A. A "(-6, -5)
B. D'(2,-5)
C. C (2.0)
D. D(5,-5)
E. C'(-1,0)
F. A (-3,-5)
G. B'(-5, 0)
H. B (-2, 0)
Please help
The translated coordinates are:
A: A'(-6, -5) ⇒ A''(-3,-7)
B: D'(2,-5) ⇒ D''(8, -7)
C: C (2, 0) ⇒ C'(5, -2)
D: D(5,-5) ⇒ D'(8, -7)
E; C'(-1,0) ⇒ C''(2, -2)
F: A (-3,-5) ⇒ A'(0, -7)
G: B'(-5, 0 ) ⇒ B''(-2, -2)
H: B (-2, 0) ⇒ B'(1, -2)
Here,
We have to apply a translation of 2 units down and 3 units right to these coordinates.
Translation means moving the entire polygon in a particular direction by a certain distance.
To apply the translation,
Add the same amount of distance to the x-coordinate of each vertex for the rightward motion, and subtract the same amount of distance from the y-coordinate of each vertex for the downward motion.
In this case,
the translation is 2 units down and 3 units right.
So the new coordinates will be:
A: A'(-6, -5) ⇒ A'( -6+ 3, -5-2)
= A''(-3,-7)
B: D'(2,-5) ⇒ D'(5+3, -5 -2 )
= D''(8, -7)
Similarly apply for each coordinates we get,
C: C (2, 0) ⇒ C'(5, -2)
D: D(5,-5) ⇒ D'(8, -7)
E; C'(-1,0) ⇒ C''(2, -2)
F: A (-3,-5) ⇒ A'(0, -7)
G: B'(-5, 0 ) ⇒ B''(-2, -2)
H: B (-2, 0) ⇒ B'(1, -2)
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Use the following information to determine tan(2x). tan(x) = -2÷square root of 2 and sin(x) is negative
Answer:
tan(2x) = 2√2
Step-by-step explanation:
You want tan(2x) when tan(x) is -2/√2 and x is a 4th-quadrant angle.
Double angleThe tangent double-angle identity is ...
tan(2x) = 2tan(x)/(1 -tan(x)²)
For tan(x) = -2/√2, this gives ...
tan(2x) = 2(-2/√2)/(1 -(-2/√2)²) = -2√2/(1 -2)
tan(2x) = 2√2
<95141404393>
What is the meaning of "[tex] dom(R)=\left \{ u:\exists v(u,v)\in R\right \} [/tex]"?
It means that the domain of the relation [tex]R[/tex] is the set of such elements [tex]u[/tex] for which there exists such an element [tex]v[/tex] that [tex]u[/tex] and [tex]v[/tex] are related.
In circle K with m/JKL = 74° and JK = 4, find the area of sector
JKL. Round to the nearest hundredth.
Answer:
10.33 square units
Step-by-step explanation:
Area of the sector:
∠JKL = Ф= 74°
JK = r = 4
[tex]\boxed{\text{\bf Area of sector = $ \dfrac{\theta}{360}\pi r^2$}}[/tex]
Ф is the central angle of the sector.
r is the radius
[tex]\sf Area \ of \ the \ sector = \dfrac{74}{360}*3.14*4*4[/tex]
= 10.33 square units
The patient is to receive 250ml of D5W with 10 units of oxytocin (Pictocin) IV at the rate of 0.002 units/min. How many ml per hour.
Answer:
0.5ml/hr
Step-by-step explanation:
Given:
Infusion rate: 0.002 units/min
To convert the infusion rate from units/min to ml/hr, we need to know the flow rate conversion factor specific to the medication and solution being administered.
In this case, we have the information that the patient is receiving 10 units of oxytocin (Pictocin) in 250 ml of D5W solution.
To calculate the ml/hr rate, we can use the following formula:
ml/hr = (Infusion rate in units/min * Volume in ml) / Time in min
ml/hr = (0.002 units/min * 250 ml) / 1 min
ml/hr = 0.5 ml/min
Therefore, the infusion rate of 0.002 units/min is equivalent to 0.5 ml/hr.
3.3 Determine the rule that describes the relationship between x and y values below and then use the rule to calculate the values of n and m. Show all your calculations. X y 1 3 2 5 7 4 9 (T) 5 11 11 m n 33
The values of m and n are 15 and 19, respectively in the given data.
From the given values:
x: 1, 2, 7, 4, 9
y: 3, 5, 11, m, n
Looking at the x-values, we can observe that they are increasing by 1 each time.
Looking at the y-values, we can observe that they are increasing by 2 each time except for the last two values (m and n) which are unknown.
Based on this pattern, we can establish the following equation:
y = 2x + 1
Now, let's calculate the values of m and n using this equation:
For x = 7:
y = 2(7) + 1
y = 14 + 1
y = 15
Therefore, m = 15.
For x = 9:
y = 2(9) + 1
y = 18 + 1
y = 19
Therefore, n = 19.
Hence, the values of m and n are 15 and 19, respectively.
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Name the highlighted arc.
S
E
D
0
P
Answer:
View explanation
Step-by-step explanation:
The highlighted arc from D to O
PLEASE HELP
A right cylinder has a diagonal length of 37 and a total surface area of 492π.
What is the height of the cylinder?
a.35
b.42
c.25
d.17
e.32
The height of the cylinder is 25.
Option C is the correct answer.
We have,
To find the height of the right cylinder, we need to use the given information of the diagonal length and the total surface area.
The diagonal length of a right cylinder can be found using the formula:
diagonal = √(height² + radius²)
Given that the diagonal length is 37, we can set up the equation:
37 = √(height² + radius²)
We also know that the total surface area of a right cylinder is given by:
surface area = 2πrh + 2πr²
Given that the total surface area is 492π, we can set up the equation:
492π = 2πrh + 2πr²
Simplifying the surface area equation, we have:
246 = rh + r²
Now we have a system of equations:
37 = √(height² + radius²)
246 = rh + r²
Since we only need to find the height of the cylinder, we can focus on the first equation:
37 = √(height² + radius²)
Squaring both sides of the equation, we get:
37² = height² + radius²
1369 = height² + radius²
Substituting the second equation (246 = rh + r²) into the equation above, we have:
1369 = height² + (246 - rh)
Simplifying further, we get:
1369 = height² + 246 - rh
Now, let's analyze the answer options:
a. 35
b. 42
c. 25
d. 17
e. 32
We need to substitute each value into the equation and check if it satisfies the equation.
After checking each option, we find that the height that satisfies the equation is:
c. 25
Therefore,
The height of the cylinder is 25.
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Find the area of each sector.
16) r= 16 mi, 0 = 150°
25m
3
mi²
40T
3
mi²
67 mi²
A
170065
To find the area of a sector, you can use the formula:
Area of Sector = (θ/360) * π * r^2
where θ is the central angle in degrees, r is the radius, and π is a mathematical constant approximately equal to 3.14159.
Let's calculate the areas for the given sectors:
r = 16 mi, θ = 150°
Area of Sector = (150/360) * π * (16 mi)^2
= (5/12) * π * 256 mi^2
≈ 334.930 mi^2
Therefore, the area of sector 16 is approximately 334.930 square miles.
Which statement best describes the possible value of
the median time of students riding the bus to school?
✓ The median time is less than 25 minutes.
*
The median time is exactly equal to 25 minutes.
The median time is approximately equal to 25
minutes.
The median time is greater than 25 minutes.
ANSWER IS A!!
Answer:
Step-by-step explanation:
The median time is less than 25 minutes
help me please
it’s past due
The measure of the ∠d is 65 degrees.
The measure of the ∠c is 89 degrees.
The measure of the arc a is 131 degrees.
The measure of arc b is 47 degrees.
How to determine the valuesThe value of each variable. For the circle, the dot represents the center.
1. The measure of ∠d is;
∠d+ 115°= 180°
∠d= 180°-115°= 65°
The measure of the ∠d is 65 degrees.
2. The measure of ∠c is,
∠c+ 91°= 180°
∠c =180°-91° =89°
The measure of the ∠c is 89 degrees.
3. The measure of arc a is,
The inscribed angle measures half that of the arc comprising;
arc a = 230 - 90
arc a = 131 degrees
4. The measure of arc b is,
The inscribed angle measures half that of the arc comprising;
arc b = 178 - 131
arc b = 47 degrees
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i am going toget a detention if i dont do this please help me
QUESTION 1
A credit card has a balance of $1,400. The APR is 25% and the minimum payment is 3% of the balance. You will pay the minimum balance this month. If you do not use the card again then how much
should the balance be next month?
QUESTION 2
A credit card with an APR of 18% has a balance of $2500 on it. You make a $1400 payment that posts on the 11th day of a 31-day month. How much interest will you be charged for the month?
QUESTION 3
Suppose we have a card with an APR of 25%. The minimum payment is 7% of the balance Suppose we have a balance of $350 on the credit card. We decide to stop charging and to pay it off by making
the minimum payment each month.
Calculate the new balance after the first minimum payment is made.
Calculate the minimum payment that is due the next month.
QUESTION 4
Your credit card has a balance of $2500 and an interest rate of 21%. The credit card requires a minimum payment of 3%
Lennors
Answer:
Q1: $1,360, Q2: $30.83, Q3: $325.50, Q4: $75
Step-by-step explanation:
QUESTION 1:
If the minimum payment is made and no additional charges are made, the balance next month should be $1,400 minus 3% of $1,400, which is $1,360.
QUESTION 2:
To calculate the interest charged for the month, we need to determine the average daily balance. Assuming no other transactions, the average daily balance would be (($2,500 * 20) + ($1,100 * 10)) / 31 = $2,032.26. Multiply this by the APR of 18% and divide by 365 to get the daily interest rate. The interest charged for the month would be approximately ($2,032.26 * 0.18) / 365 * 31 = $30.83.
QUESTION 3:
After making the first minimum pyment, the new balance would be $350 minus 7% of $350, which is $325.50.
To calculate the minimum payment due the next month, we take 7% of the new balance, which is 7% of $325.50, equal to $22.79 (rounded to the nearest cent).
QUESTION 4:
The minimum payment required on a balance of $2,500 would be 3% of $2,500, which is $75.
10
Select the correct answer.
The given equation has been solved in the table.
Step
1
2
3₂
4
5
-
Statement
-7--7
7+7=-7+7
0
2
22-0
2=0
=
In which step was the subtraction property of equality applied?
O A. step 2
OB.
step 3
OC.
step 4
O D.
The subtraction property of equality was not applied to solve this equation.
The step in which the subtraction property of equality was applied to solve the equation is given as follows:
D. The subtraction property of equality was not applied to solve this equation.
What is the subtraction property of equality?The subtraction property of equality states that subtracting the same number from both sides of an equation does not affect the equality, and hence it is used to isolate a variable that is adding on a side of the expression.
For this problem, to remove the term -7, we add 7 to both sides of the expression, hence the addition property of equality was applied.
In the other step, the multiplication property was applied, hence option D is the correct option for this problem.
More can be learned about the subtraction property of equality at https://brainly.com/question/1601404
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Calculate the area of the composite figure please help me with the total area and shape part especially the solve for area please
a. Shape 1 = 24cm²
Shape 2 = 14.1cm²]
Total area = 38.1cm²
b. Shape 1 = 50ft²
Shape 2 = 24ft²
Total area = 74ft²
How to determine the valuesThe formula for calculating area of a triangle is;
A = 1/2bh
Substitute the values
A = 1/2 × 8 × 6
Multiply the values
A = 24cm²
Area of a semicircle =3. 14 × 3²/2 = 14.1cm²
Total area = 38.1cm²
2. Area of the trapezoid is;
A = a +b/2h
A = 20/2(5) = 50ft²
Area of the triangle;
A = 1/2 × 6 × 8
A = 24ft²
Learn more about area at: https://brainly.com/question/25292087
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