The probability of a family having two boy children is 0.25, or 25%. This probability is determined by a simple calculation. If there are two children in the family, the probability of each child being a boy is 0.5 (50%), and the probability of both children being boys is 0.5 x 0.5, or 0.25 (25%).
When it comes to probability, the likelihood of an event is determined by the number of possible outcomes. In the case of this question, there are four possible outcomes: two boys, two girls, one boy and one girl, and one girl and one boy. Since each outcome is equally likely, each has a probability of 0.25 (25%).
It is important to note that the probability of a family having two boy children is the same as the probability of a family having two girls. In each case, the probability is 0.25 (25%). This is because the gender of a child is independent of the gender of their sibling.
In conclusion, the probability of a family having two boy children is 0.25 (25%). This probability is determined by the number of possible outcomes, each of which is equally likely. It is also important to note that this probability is the same for a family having two girls.
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Help em fin the answer
Answer:
1 ft per 4 seconds
120 seconds
72 seconds
Step-by-step explanation:
-2(-3)+27÷(-3)+3?
Please help
Answer:
0
Step-by-step explanation:
-2(-3)+27÷(-3)+3
6-9+3
0
Given:-
[tex] \tt \: -2 ( - 3 )+27 ÷ ( - 3 ) + 3 = ?[/tex][tex] \: [/tex]
Solution:-
[tex] \tt \: -2 ( - 3 )+27 ÷ ( - 3 ) + 3 = ?[/tex][tex] \: [/tex]
[tex] \tt \: [-2 ( - 3 ) + 27 ÷ ( - 3 )] + 3 [/tex][tex] \: [/tex]
[tex] \tt \: 6 - 9 + 3[/tex][tex] \: [/tex]
[tex] \tt \: -3 + 3[/tex][tex] \: [/tex]
[tex] \boxed{ \tt {\purple{ \: \:0 \: \: }}}[/tex][tex] \: [/tex]
━━━━━━━━━━━━━━━━━━━━━━━
hope it helps! :)
Write a cosine function that has an amplitude of 3, a midline of y = 4 and a period of 2/3
Answer:
[tex]y=3cos(3\pi x)+4[/tex]
Step-by-step explanation:
[tex]f(x)=cos(x)\\[/tex]
[tex]A(f(Bx+C)+D)[/tex]
The outside constants, A & D stretch and shift vertically. The inside constants, B & C stretch and shift horizontally. B & C work oppositely, basically multiplying by B stretches by a factor of 1/B and similarly adding C shifts f(x) horizontally to the left.
[tex]f(x)=cos(x) \text{ The function which we are transforming}\\\text{It currently has a amplitude of 1, time period of $2\pi$ and mid line at $y=0$}[/tex]
[tex]A=3 \text{ As we want to stretch it by 3 units vertically.}\\\text {To find B:}\\T' = T*(1/B)\\\text{Where $T'$ is new time period and T is existing time period}\\2/3=2\pi*(1/B)\\B=3\pi\\\text{C is not needed}\\D=4 \text{ To shift function by 4 units up}[/tex]
I hope this helps
Determine a series of transformations that would map Figure D onto Figure E.
Figure E is a rotated and reflected version of Figure D that has been shifted to the right and up as a result of this transformation sequence.
What is a transformation sequence called?The sequence transformation (which may be dependent on n). This is known as a linear sequence transformation. Nonlinear sequence transformations are nonlinear sequence transformations.
We can use the following transformations to map Figure D onto Figure E:
Figure D should be translated 4 units to the right and 1 unit up.
Figure D should be rotated 90 degrees clockwise around the origin.
Cross the y-axis with the resulting figure.
This transformation sequence results in Figure E, which is a rotated and reflected version of Figure D that has been shifted to the right and up.
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Let f(x)=3x^2 ÷4x^2+4 and
g(x)= 5x-2÷x+2 then find the following a, fog(3) b, fog(4)
From the given information provided, the value of fog(3) and fog(4) is 0.971 and 27/40 respectively.
a) To find fog(3), we first need to find g(3) and then evaluate f(g(3)).
To find g(3), we substitute x=3 into the formula for g(x):
g(3) = (5(3) - 2)/(3 + 2) = 13/5
Now, we can evaluate f(g(3)) by substituting g(3) into the formula for f(x):
f(g(3)) = f(13/5) = 3(13/5)² / (4(13/5)² + 4) = 0.971
Therefore, fog(3) = 0.971.
b) To find fog(4), we follow the same process. First, we find g(4):
g(4) = (5(4) - 2)/(4 + 2) = 18/6 = 3
Now, we can evaluate f(g(4)) by substituting g(4) into the formula for f(x):
f(g(4)) = f(3) = 3(3)² / (4(3)² + 4) = 27/40
Therefore, fog(4) = 27/40.
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HELP ME PLS! Brainlist :)
SHOW HOW U GOT IT AND SHOW ALL STEPS! IF CORRECT WILL MAKE U BRAINLIST!
Answer:
surface area = (Perimeter of the base × Length of the prism) + (2 × Base Area) = (S1 + S2+ S3)L + bh; where 'b' is the bottom edge of the base triangle, 'h' is the height of the base triangle, L is the length of the prism and S1, S2 and S3 ...
Surface Area of Triangular Prism - Formula, Examples
Step-by-step explanation:
PLS HELP! WILL MAKE U BRAINLIST!
Find the point of intersection using substitution. DO NOT USE ANOTHER METHOD. Show all your thinking.
Answer:
(-2,-3)
Step-by-step explanation:
3x+y=-9
-3x -3x
y=-3x-9
5x-3(-3x-9)=-1
14x+ 27= -1
-27 -27
14x= -28
/14 /14
x=-2
plug in x
3(-2)+y=-9
-6+y=-9
+6 +6
y=-3
There are 6 cups of oatmeal in a container. Stella eats ¼ cup of oatmeal every day for breakfast. In how many days will Stella finish all the oatmeal in the container?
It will take Stella 24 days to finish all the oatmeal in the container if she eats 1/4 cup every day for breakfast.
The container has 6 cups of oatmeal and Stella eats 1/4 cup every day for breakfast.
To find the number of days it will take Stella to finish all the oatmeal, we can use the formula:
Number of days = Total amount of oatmeal ÷ Amount of oatmeal consumed per dayTotal amount of oatmeal in the container = 6 cups
Amount of oatmeal consumed by Stella per day = 1/4 cup
Number of days = 6 cups ÷ 1/4 cup = 24 daysTherefore, it will take Stella 24 days to finish all the oatmeal in the container if she eats 1/4 cup every day for breakfast.
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the average rent in a city is $1,510 per month with a standard deviation of $210. assume rent follows the normal distribution. [you may find it useful to reference the z table.] a. what percentage of rents are between $1,300 and $1,720?
The percentage of rents between $1,300 and $1,720 is 34.13%.
To calculate this, we need to use the z-score formula to convert the rent range into a z-score range. The z-score formula is (x-μ)/σ, where x is the rent range, μ is the mean rent and σ is the standard deviation.
To calculate the lower z-score, the formula becomes (1300-1510)/210 = -1.19.
To calculate the higher z-score, the formula becomes (1720-1510)/210 = 1.14. The z-score of -1.19 to 1.14 corresponds to 34.13% according to the z-table. Therefore, 34.13% of rents are between $1,300 and $1,720.
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A boat is heading towards a lighthouse, where Dominic is watching from a vertical distance of 114 feet above the water. Dominic measures an angle of depression to the boat at point � A to be 6 ∘ ∘ . At some later time, Dominic takes another measurement and finds the angle of depression to the boat (now at point � B) to be 32 ∘ ∘ . Find the distance from point � A to point � B. Round your answer to the nearest foot if necessary.
The distance from point A to point B is approximately 1363.7 feet.
How to solveUsing slope concept:
tan(θ1) = h/d
tan(θ2) = h/(d+x), where x is the distance from point A to the boat when Dominic measured the angle of depression at point B.
We can rearrange these equations to solve for h and x:
h = d*tan(θ1)
h = (d+x)*tan(θ2)
d*tan(θ1) = (d+x)*tan(θ2)
d*(tan(θ1)-tan(θ2)) = x*tan(θ2)
d = x*tan(θ2)/(tan(θ1)-tan(θ2))
Substituting the given values, we get:
d = x*tan(32°)/(tan(6°)-tan(32°))
Using a calculator, we can evaluate this expression to get:
d ≈ 1363.7 feet
Therefore, the distance from point A to point B is approximately 1363.7 feet.
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Really appreciated :))) 25 points (reupload)
Answer:
a)30
b)25
Step-by-step explanation:
ratio of red socks and total sock is 1:6 so, lets show this as,
1k and 6k.
1k-------5
6k------x
x=30
a)total socks = 30
b)black socks =total-red socks=30-5=25
Bob can afford to deposit $400 a month into a retirement account that compounds interest monthly with an APR of 1.8%. His plan is to have $200,000 saved so that he can then retire. Approximately how long will it take him to reach this goal?
it will take Bob approximately 47.3 years to save $200,000 for his retirement.
How to find?
To determine the time it will take Bob to reach his retirement goal of $200,000, we can use the formula for compound interest:
A = P(1 + r/n)²(nt)
where:
A = the final amount
P = the initial principal (deposit)
r = the annual interest rate (as a decimal)
n = the number of times the interest is compounded per year
t = the time (in years)
In this case, we have:
P = $400 (monthly deposit)
r = 1.8% (annual interest rate, compounded monthly)
n = 12 (compounded monthly)
A = $200,000
We can solve for t by substituting the given values and solving for t:
200,000 = 400(1 + 0.018/12)²(12t)
500 = (1 + 0.0015)²(12t)
log(500) = 12t log(1.0015)
t = log(500) / (12 log(1.0015))
t ≈ 47.3
Therefore, it will take Bob approximately 47.3 years to save $200,000 for his retirement.
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The length of the shadow of a pole having 20m height is 20√3m. Find the length of the shadow of a pole of height 25√3m at the Same time.
The length of the shadow of the second pole is 75 meters, was solved by using the concept of similar triangles.
What is the concept of similar triangles?The concept of similar triangles is based on the idea that if two triangles have the same shape but different sizes, they are called similar triangles. This means that their corresponding angles are equal and their corresponding sides are in proportion.
What are triangles?A triangle is a 2-dimensional geometric shape with three sides, three angles, and three vertices. It is one of the basic shapes in geometry and is used to describe many real-world objects and phenomena.
In the given question,
Length of shadow of first pole / Height of first pole = Length of shadow of second pole / Height of second pole
Substituting the given values, we get:
20√3 / 20 = x / 25√3
Simplifying, we get:
x = (20√3 / 20) * 25√3
x = 25*3
x = 75
Therefore, the length of the shadow of the second pole is 75 meters.
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She added 3 apples, 5 oranges, 2 pears, 4 plums, and 1 pomegranate. Her daughter grabs a piece of fruit without looking and chooses an apple for breakfast. What was the probability of that happening?
Answer:14
Step-by-step explanation: I added 3 + 5 + 2 + 4 + 1 which gave me 15 and her daughter took 1 fruit so it is 14 fruits left
Layson, Jane
Mark has a key ring with 10 similar keys. There are 3 gym locker keys, 2 car keys, I door key, and 4 toolbox keys. If Mark selects one key without looking, what is the probability he
selects a car key or door key?
The probability that Mark selects a car key or door key from the key ring is 0.3 or 30%.
What is probability?
Probability is a measure of the likelihood or chance of an event occurring. It is a number between 0 and 1, where 0 represents an impossible event and 1 represents a certain event. Probability is calculated by dividing the number of favorable outcomes by the total number of possible outcomes. Probability theory provides a framework for understanding random events and the laws of chance, and it is an important tool for modeling and simulating complex systems.
Calculating the probability that he selects a car key or door key :
In this context, we are asked to find the probability of Mark selecting a car key or door key from the key ring. To calculate this probability, we need to first determine the total number of keys on the key ring and then count the number of car keys and door keys.
Total number of keys = 10
Number of car keys = 2
Number of door keys = 1
The probability of selecting a car key or door key can be found by adding the probability of selecting a car key to the probability of selecting a door key. Since there is only one door key and two car keys, the probability of selecting a car key is higher, and we can simplify the calculation by finding the probability of selecting a car key and then adding the probability of selecting a door key that hasn't already been selected.
Probability of selecting a car key = 2/10 = 0.2
Probability of selecting a door key = 1/9 (since one key has already been selected) = 0.1111...
Therefore, the probability of Mark selecting a car key or door key from the key ring is 0.2 + 0.1111... ≈ 0.3 or 30%.
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Click an item in the list or group of pictures at the bottom of the problem and, holding the button down, drag it into the correct position in the answer box. Release your mouse button when the item is place. If you change your mind, drag the item to the trashcan. Click the trashcan to clear all your answers.
Complete the following proof.
Given: mXOY = m WOV
m -- YZ = m --ZW
Prove: m -- XZ = m -- ZV
Since mXOY = mWOV, we can form the following equations so, m--XZ = m--ZV.
What is equation?An equation is a mathematical statement that states the equality of two expressions. It usually consists of two terms, with an equals sign between them, representing the relationship between the terms. Equations are often used to describe relationships between variables, such as in physics and chemistry, and can be used to calculate unknown values.
Proof:
Since mXOY = mWOV, we can form the following equations:
m--YZ = m--ZW (Given)
Subtract both sides of the equation by m to get:
YZ = ZW
Then, multiply both sides of the equation by X to get:
XZ = XW
Now, substitute Y for V and W for V in the equation to get:
XZ = ZV
Finally, subtract both sides of the equation by m to get:
m--XZ = m--ZV
Therefore, m--XZ = m--ZV.
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Mai drove 355 miles using 17 gallons of gas. At this rate, how many gallons of gas would she need to drive 284 miles?
Answer: We can use a proportion to solve the problem:
17 gallons / 355 miles = x gallons / 284 miles
Cross-multiplying, we get:
17 * 284 = 355 * x
4844 = 355x
x = 13.66 (rounded to two decimal places)
Therefore, Mai would need approximately 13.66 gallons of gas to drive 284 miles at the same rate.
Step-by-step explanation:
Triangle ABC is similar to triangle DEF. The tangent of angle A is equal to 5/12. What is the sine of angle F? Enter the answer in the box. If necessary, enter the answer as a fraction in the simplest form.
Triangle ABC is similar to triangle DEF. The tangent of angle A is equal to 5/12 and the sine of angle F is 1/13.
How is the sine of an angle determined?The sine of the angle is the proportion of a right-angled triangle's hypotenuse to its perpendicular.
Triangle ABC and triangle DEF are similar in that their respective sides are proportional and their corresponding angles are equal. As a result, we have:
BC/EF = AC/DF = AB/DE
To determine the ratio AB/BC, we can utilise the tangent of angle A:
Tan(A) = 5/12 = AB/BC
By multiplying both sides by 12, we may make this simpler:
AB/BC = 12 tan(A).
We can now determine the ratio AB/EF using the ratio BC/EF:
AB/DE = BC/EF
This can be rearranged to yield AB/EF:
BC/EF * DE/AB = AB/EF
Due to the similarity of the triangles, we know that BC/EF = 12/13 and can therefore insert this into the equation:
(12/13) * (AB/DE) = AB/EF
Using the formula AB/DE = 5/12 (from above), we can reduce this:
AB/EF = (12/13) * (5/12) = 5/13
Finally, we may calculate the sine of angle F using the sine ratio:
sinning(F) = EF/DF
Using the ratio AB/EF that we recently discovered, we may rephrase this as follows:
sin(F) = (1/AB) * (AB/EF) = (1/AB) * (5/13)
Simplifying and substituting AB = 5k results in:
sin(F) is equal to (1/5k) x (5/13) x 1/(k*13).
We can select k = 1 because we want the response in its simplest form:
sin(F) = 1/13
As a result, 1/13 is the sine of angle F.
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suppose the time to process a loan application follows a uniform distribution over the range 5 to 17 days. what is the probability that a randomly selected loan application takes longer than 11 days to process?
The probability that a randomly selected loan application takes longer than 11 days to process is 0.1587.
The time taken to process a loan application is uniformly distributed between 5 and 17 days.
We need to determine the probability that a random loan application takes longer than 11 days to process.
To compute the probability, we'll first determine the distribution's parameters;
we have: a = 5 (minimum value)b = 17 (maximum value)
Mean: μ = (a+b) / 2 = (5+17) / 2 = 11
Variance: σ2 = (b-a)2/12
= (17-5)2/12
= 12.3333Standard deviation:
σ = 3.516
For the problem, we want to find the probability of a loan application taking more than 11 days to be processed.
In other words, we want to find the probability of the application taking more than one standard deviation from the mean, that is, P(X > μ + σ).
Since the distribution is symmetric, we can also find the probability by calculating P(X < μ - σ) and subtracting the result from 1, since the total probability must be 1.
Using the above formula, we have:
P(X > μ + σ) = P(X > 11 + 3.516)
= P(X > 14.516)
To standardize the value of 14.516, we'll convert it to a z-score, which is z = (X - μ) / σ.
Therefore, we have z = (14.516 - 11) / 3.516 = 1
Since we are dealing with a standard normal distribution, we can use the standard normal distribution table to find the probability associated with z = 1.
From the table, we find that the probability of z being less than 1 is 0.8413;
thus, the probability of z being greater than 1 is 1 - 0.8413 = 0.1587.
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Alyssa and Caleb were splitting nachos. Alyssa ate 1/2 of the nachos and Caleb ate 1/3 of the nachos.
What fraction of the nachos did they eat together?
Alyssa and Caleb ate 5/6 of the nachos together.
To calculate the fraction of nachos that Alyssa and Caleb ate together, add the fractions representing the portions that they each ate. However, because the fractions have different denominators, we must first find a common denominator.
2 and 3 share a common denominator of 6. With a denominator of 6, we can rewrite 1/2 and 1/3 as follows:
1/2 = 3/6
1/3 = 2/6
We can now add these fractions:
3/6 + 2/6 = 5/6
As a result, Alyssa and Caleb shared 5/6 of the nachos.
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For a school field trip, a charter bus company charges a $50 reservation fee for the group, plus an additional $12 per student. Let n
represent the number of students going on the field trip.
The expression that best represents the total cost of the charter bus for the field trip is 12n + 50
Which expression best represents the total cost of the charterThe total cost of the charter bus for the field trip consists of a $50 reservation fee and an additional $12 per student.
If n represents the number of students going on the field trip, then the expression for the total cost can be written as:
Total cost = 12n + 50
This expression represents the variable cost of the charter bus, which depends on the number of students going on the field trip.
The fixed cost of $50 is added to the variable cost to give the total cost.
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the amount of jen's monthly phone bill is normally distributed with a population mean of $86 and a population standard deviation of $9. between what two values are 68.26% of her phone bills? $ and $ . (your answers should be integers - no decimal places.)
If the amount of jen's monthly phone bill is normally distributed with a mean of $86 and standard deviation of $9, Between the values of $77 and $95 inclusive, 68.26% of Jen's phone bills are expected to fall.
To find the values between which 68.26% of Jen's phone bills lie, we need to use the properties of the normal distribution and the empirical rule.
The empirical rule states that for a normal distribution, approximately 68% of the data lie within one standard deviation of the mean. Therefore, we can find the values between which 68.26% of Jen's phone bills lie by calculating the range of values that are one standard deviation away from the mean.
Using the given population mean of $86 and population standard deviation of $9, we can calculate one standard deviation as follows:
One standard deviation = population standard deviation = $9
To find the lower and upper bounds for 68.26% of Jen's phone bills, we can subtract and add one standard deviation from the mean, respectively:
Lower bound = population mean - one standard deviation = $86 - $9 = $77
Upper bound = population mean + one standard deviation = $86 + $9 = $95
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The graph below shows the relationship between life expectancy and infant mortality in a random sample of countries.
Answer choices.
Positive linear association
Negative linear association
Non linear association
No association
Answer:
negative linear association
Step-by-step explanation:
The best description of the association between life expectancy and infant mortality rate in the given graph is option B. Countries with higher infant mortality rates tended to have shorter life expectancies.
The negative linear association between life expectancy and infant mortality rate in the attached graph,
Life Expectancy,
Life expectancy refers to the average number of years a person is expected to live from birth.
In the graph, life expectancy is represented on the vertical axis (y-axis).
Infant Mortality Rate,
Infant mortality rate refers to the number of deaths of infants under one year of age per 1,000 live births.
In the graph, the infant mortality rate is represented on the horizontal axis (x-axis).
Negative Linear Association,
A negative linear association means that as one variable increases, the other variable tends to decrease at a consistent rate.
here, as the infant mortality rate increases (moving right on the x-axis), the life expectancy tends to decrease (moving down on the y-axis).
Interpretation,
Looking at the graph, we can see that countries with higher infant mortality rates are positioned towards the right side of the graph,
and they tend to have shorter life expectancies, which are positioned towards the bottom of the graph.
Conversely, countries with lower infant mortality rates are positioned towards the left side of the graph, and they tend to have longer life expectancies,
which are positioned towards the top of the graph.
Implication,
The negative linear association in the graph indicates that countries with higher rates of infant mortality are likely to have lower life expectancies.
This is because higher infant mortality rates often indicate poorer healthcare systems, lower living standards,
and other factors that can impact life expectancy negatively.
Therefore, based on the graph's trend, we can conclude that the statement B is the best description of the association between life expectancy and infant mortality rate.
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The above question is incomplete , the complete question is :
The Graph Below Shows The Relationship Between Life Expectancy And Infant Mortality Rate In A Random Sample Of Countries.
Which statement is the best description of the association between these variables? Choose all that apply.
A. Countries with higher infant mortality rates tended to have longer life expectancies.
B. Countries with higher infant mortality rates tended to have shorter life expectancies.
C. There is no clear relationship between infant mortality rates and life expectancy.
Attached graph.
I need help with this please ASAP people keep on skipping I need help
Answer:
To create a line plot for this data, we can first convert all the fractions to a common denominator, such as eighths:
Monday: 6/8 of an hour
Wednesday: 4/8 of an hour
Friday: 2/8 of an hour
Sunday: 4/8 of an hour
Then, we can draw a number line with tick marks representing each day of the week and plot a dot for each amount of time spent working out:
0 1 2 3 4
|---------|---------|---------|---------| <- Number line
. .
. .
. .
. .
To find out how much time June should work out each day to spend an even amount of time working out, we can first find the total amount of time she spent working out:
6/8 + 4/8 + 2/8 + 4/8 = 16/8 = 2 hours
Since there are four days she worked out, to find out how much time she should work out each day, we can divide the total time by four:
2 hours ÷ 4 = 0.5 hours
Therefore, June should work out for 0.5 hours, or 30 minutes, each day to spend an even amount of time working out.
Determine how many places the following 2 conic intersect at and if they intersect find the point or points of intersection. Solve the system over the real numbers for 19 and 20. x^(2)+y^(2)=34 3x-3y=6
The intersection points of the two conics are therefore[tex](1 + √14, -1 + √14)[/tex]and [tex](1 - √14, -1 - √14).[/tex]Hence, the two conics intersect at two points.
The point or points of intersection and the number of places the following 2 conic intersect is to be determined. The system over the real numbers for [tex]x² + y² = 34 and 3x - 3y = 6[/tex] is to be solved.
To determine how many points the following 2 conic intersect at, the two equations must be solved simultaneously. The points of intersection can then be determined by substituting the value of x or y into the other equation and solving for the remaining variable.The equation 3x - 3y = 6 is the equation of a straight line. Solving the equation for y, [tex]y = x - 2[/tex].
So the line passes through the point (0, -2) and (2, 0) on the x-axis. Now, substitute the value of y into the equation x² + y² = 34 to get[tex]x² + (x - 2)² = 34[/tex], expanding this gives 2x² - 4x - 26 = 0, which simplifies to x² - 2x - 13 = 0.The solution to the quadratic equation [tex]x² - 2x - 13 = 0[/tex] is given as[tex]x = 1 + √14, 1 - √14[/tex]. The corresponding value of y for each x can be calculated by substituting the value of x into the equation y = x - 2.
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Which equations have the same value of x as Three-fifths (30 x minus 15) = 72? Select three options. Group of answer choices
A 50 x minus 25 = 72
B 18 x minus 9 = 72
C 18 x minus 15 = 72
D 3 (6 x minus 3) = 72
E x = 4.5
The following equations will have the same value of x as the one provided:
(B) 18x - 9 = 72; (D) 3(6x - 3) = 72; (E) x = 4.5
What are equations?A mathematical statement that uses the word "equal to" between two expressions with the same value is called an equation.
Like 3x + 5 = 15, for instance.
Equations come in a wide variety of forms, including linear, quadratic, cubic, and others.
So, the given equation is:
3/5(30x-15)=72
Now, we have:
3/5 * 30x - 3/5 * 15 = 72
18x - 9 = 72
Using common 3 as an example, we have the following on the left side of the equation:
3(6x-3) = 72
6x-3 = 72/3
6x-3 = 24
6x = 24+3
6x = 27
x = 27/6
x = 9/2
x = 4.5
Therefore, the following equations will have the same value of x as the one provided:
(B) 18x - 9 = 72; (D) 3(6x - 3) = 72; (E) x = 4.5
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1. Label the axes
2. Graph A(-3,0) B(-2,4) C(1,-1)
draw △ABC in BLUE
3. Rotate △ABC 90° clockwise to create △ABC IN RED. List the coordinate below:
Formula (x,y) ➜ (y,x)
A (-3,0) ➜ A’ ( )
B (-2,4) ➜ B’ ( )
C (1,-1) ➜ C’ ( )
4. Translate △ABC three units down to create △ABC IN GREEN. What are the coordinates of △ABC?
A ( )
B ( )
C ( )
In response to the stated question, we may state that The coordinates of equation triangle ABC in green are: A" (-3,-3); B" (-2,1); C" (1,-4)
What is equation?An equation in mathematics is a statement that states the equality of two expressions. An equation is made up of two sides that are separated by an algebraic equation (=). For example, the argument "2x + 3 = 9" asserts that the phrase "2x + 3" equals the number "9". The purpose of equation solving is to determine the value or values of the variable(s) that will allow the equation to be true. Equations can be simple or complicated, regular or nonlinear, and include one or more elements. In the equation "x2 + 2x - 3 = 0," for example, the variable x is raised to the second power. Lines are utilised in many different areas of mathematics, such as algebra, calculus, and geometry.
The x-axis is horizontal and the y-axis is vertical.
4 B(−2, 4)
| *
| / \
| / \
|/_____\
A(−3, 0) C(1, −1)
4 B(−2, 4) C'(4, 1)
| * *
| / \ / \
| / \ / \
|/_____\-3, 0 -1, 1 A'(0, -3)
A(-3, 0) C(1, −1) B'(4, -2)
A' (-3,0) ➜ (0,-3)
B' (-2,4) ➜ (4,-2)
C' (1,-1) ➜ (-1,1)
1 C(1, −1) C"(1, -4)
| * *
| / \ / \
| / \ / \
|/_____\-3, -3 -2, 1 A'(-3, -3)
A(-3, 0) B(-2, 4) B'(-2, 1)
A' (-3,0) ➜ A" (-3,-3)
B' (-2,4) ➜ B" (-2,1)
C (1,-1) ➜ C" (1,-4)
The coordinates of triangle ABC in green are:
A" (-3,-3)
B" (-2,1)
C" (1,-4)
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the probabilities of an arborist breaking a saw chain in a day's work are 0.004 for a small climbing saw, 0.008 for a medium limbing saw, and 0.04 for a large felling and bucking saw. what is the probability that he will break a chain on a day in which he spends 1/2 of his time climbing, 3/8 limbing, and 1/8 felling and bucking? multiple choice question.
The probability that the arborist will break a saw chain on a day in which he spends 1/2 of his time climbing, 3/8 limbing, and 1/8 felling and bucking is 0.007
We are given the probabilities of an arborist breaking a saw chain in a day's work are 0.004 for a small climbing saw, 0.008 for a medium limbing saw, and 0.04 for a large felling and bucking saw.
The time that he spends on each saw are 1/2 of his time climbing, 3/8 limbing, and 1/8 felling and bucking.
Let us find the probability that he will break a chain when he uses the small climbing saw.
P(small climbing saw) = 1/2P(Break a chain using small climbing saw) = 0.004
Using the medium limbing saw: P(medium limbing saw) = 3/8P(Break a chain using medium limbing saw) = 0.008
Using the large felling and bucking saw: P(large felling and bucking saw) = 1/8P(Break a chain using large felling and bucking saw) = 0.04
Now, to find the probability that he will break a chain on a day, we use the weighted average. Probability is a weighted average because the probability of breaking the saw chain is different for each saw that he uses.
Hence, the probability that he breaks a saw chain when he uses each saw is weighted according to how much time he spends on that saw.
P = P(small climbing saw)* P(Break a chain using small climbing saw) + P(medium limbing saw) * P(Break a chain using medium limbing saw) + P(large felling and bucking saw) * P(Break a chain using large felling and bucking saw)P = (1/2 * 0.004) + (3/8 * 0.008) + (1/8 * 0.04)P = 0.007
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Please help it’s urgent!!! Pls help!!! Will give brainliest!!Tina purchased a new refrigerator
on a payment plan. Four months after purchasing the refrigerator, the balance was $630. Six months after purchasing the refrigerator,
the balance was $520.
Write an equation that models the balance y after t months.
y = _t + _
Answer:
We can use the slope-intercept form of a linear equation to model the balance y after t months, where the slope represents the rate of change of the balance and the y-intercept represents the initial balance.
The initial balance (y-intercept) is the amount Tina borrowed to buy the refrigerator, which we don't know. But we can find the slope using the two data points provided:
Four months: balance = $630
Six months: balance = $520
The change in the balance over the two-month period is:
$520 - $630 = -$110
The slope of the line is the rate of change of the balance per month, which is:
slope = Δy/Δt = (-$110)/(6-4) = -$55/month
Using the point-slope form of a linear equation, we can plug in one of the data points to find the y-intercept:
y - 630 = -$55(t - 4)
y - 630 = -$55t + 220
y = -$55t + 850
Therefore, the equation that models the balance y after t months is:
y = -$55t + 850.
Pls help me with 10 asap I will mark brainiest if it’s correct
The value of p from the given equation is 4.5.
What is an equation?In mathematics, an equation is a formula that expresses the equality of two expressions, by connecting them with the equals sign [tex]=\\[/tex].
The given equation is [tex]0.5p-3.45=-1.2[/tex]
The solution of an equation is the set of all values that, when substituted for unknowns, make an equation true.
The equation can be solved as follows
[tex]0.5p-3.45=-1.2[/tex]
[tex]0.5p= -1.2+3.45[/tex]
[tex]0.5p= 2.25[/tex]
[tex]p= 2.25\div0.5[/tex]
[tex]p= 4.5[/tex]
Therefore, the value of p is 4.5.
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