The simplified expression, expressed in expanded form, is (3m - y)/(12m + 2y).
To simplify the expression (6m² - 5my - y²)/(12m + 2y), we can factor the numerator and denominator, if possible, and then simplify the expression by canceling out common factors.
The numerator can be factored as follows:
6m² - 5my - y² = (3m - y)(2m + y)
The denominator can also be factored by factoring out a common factor of 2:
12m + 2y = 2(6m + y)
Now we can substitute these factorizations back into the original expression:
(6m² - 5my - y²)/(12m + 2y) = [(3m - y)(2m + y)]/[2(6m + y)]
We can now cancel out the common factor of (2m + y) in the numerator and denominator:
[(3m - y)(2m + y)]/[2(6m + y)] = (3m - y)/(2(6m + y))
Expanding this expression, we get:
(3m - y)/(2(6m + y)) = (3m - y)/(12m + 2y)
Therefore, the simplified expression, in expanded form, can be written as (3m - y)/(12m + 2y).
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2. a researcher wants to know how often children push other children onto the ground. to study this, she watches children on the playground for 10 minutes and records the number of pushes. what kind of sampling is she not doing?
The researcher is not conducting non-random sampling.
Random sampling is a sampling technique in which every individual or element of the population of interest has an equal opportunity of being selected for the sample. Each member of the population has an equal chance of being selected for the sample. Random sampling helps to ensure that the sample is representative of the population.
Non-random sampling, on the other hand, is a sampling technique in which the individuals or elements of the population of interest are not randomly selected. In other words, not every member of the population has an equal chance of being selected. This sampling method is biased and can lead to an unrepresentative sample.
The researcher is not conducting a non-random sampling technique because she is observing every child in the population of interest. The population of interest, in this case, is the children on the playground.
What kind of sampling is the researcher not doing?The researcher is not conducting non-random sampling because random sampling is a sampling technique in which every individual or element of the population of interest has an equal opportunity of being selected for the sample.
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simone is designing a piece of artwork in the shape of a square pyramid for a hotel. she wants to cover the pyramid with decorative glass. how many square feet of glass does simone need to cover the entire pyramid?
Simone will need approximately 429.4 square feet of glass to cover the entire pyramid.
Calculating the surface area of a square pyramid
The surface area of a square pyramid can be calculated by using the following formula: S = l² + 2lw
where, S = surface areal = length of one side of the bases = 10 feet
w = slant height of the pyramid
We need to find the slant height of the pyramid to calculate the surface area of the pyramid.
The slant height of the square pyramid can be calculated using the Pythagorean theorem. We can draw a triangle by joining the midpoint of one of the sides of the base and the apex of the pyramid.
This will divide the pyramid into two right triangles. Using the Pythagorean theorem, we have; l² + h² = sl²
where, h = height of the pyramid = 14 feet
l = half the length of one of the sides of the base = 5 feet
Substituting the given values into the above formula, we get;
5² + 14² = s²
25 + 196 = s²
221 = s²s = √221 ≈ 14.87 feet
Now that we have the slant height of the pyramid, we can substitute the values into the surface area formula we had earlier: S = l² + 2lw
S = 10² + 2(10)(14.87)S ≈ 429.4 square feet
Therefore, Simone will need approximately 429.4 square feet of glass to cover the entire pyramid.
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Question 1 A horizontal or vertical line segment with a length of 12 units has one endpoint at (-2,-7). Identify the ordered pairs of three points that could each be the other endpoint of the line segment. Use the coordinate plane if needed. Answer format: (x,y)
the ordered pairs of three points that could each be the other endpoint of the line segment are (10,-7) or (-14,-7) and (-2,5) or (-2,-19)
Define Line segment
A line segment in geometry contains two different points on it that called its boundaries. A line segment is sometimes called as a section of a line that links two places.
Given
One end point=(-2,-7)
Length of the line segment=12unit
Line segment is horizontal
Ordered pair that will be other end of the line segment=(-2+12,-7) or(-2-12,-7)
=(10,-7) or (-14,-7)
Line segment is Vertical
Ordered pair that will be other end of the line segment=(-2,-7+12) or(-2,-7-12)
=(-2,5) or (-2,-19)
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Use 3.14 for pi and round your answer to the nearest millimeter if necessary. please answer all three questions.
The ant must crawl 454.48 mm upwards to get from the base of the cone to the top of the hill. Inserting the values of h (447.68 mm) and r (20 mm) into the equation gives h = 8792/(3.14*202))*3 = 447.68 mm.
What is a cone?A cone is a three-dimensional geometric form with a smooth taper from a flat cylindrical base to a singular spot known as the tip. A cone has a curved surface that stretches from the base to the tip and an axis that runs through the base and apex.
The formula for the height of the cone is: Height = 3/πr2 (where r is the radius of the base of the cone). In this case, the radius is 20 mm, so the height is equal to: Height = 3/π(20)2 = 60/π mm. The slant height, s, is equal to the square root of the height squared plus the radius squared. the distance the ant has to crawl from the base of the cone to the top of the hill, we can use the Pythagorean theorem to find.
1. To find the height of the cone, the formula for the volume of a cone can be used, where V = (1/3)πr2h. Rearranging this formula gives h = (V/(πr2))*3, where V is the volume of the anthill (8792 mm3), π is 3.14, and r is the radius of the anthill (20 mm).
2. The slant height of a cone is the distance from the center of the circle at the base of the cone to the apex of the cone. It is equal to the square root of the sum of the squared height of the cone and the squared radius of the cone. This can be expressed using the Pythagorean Theorem, where s = √h2 + r2.
A cone is a three-dimensional geometric shape with a circular base and a pointed apex. It is one of the two basic forms of a solid in geometry, the other one being a sphere.
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-5x+4y=3 what is the total of x
Answer:
x= -3/5+4y/5
x= -3/5 or -0.6 in decimal form
Step-by-step explanation:
I hope this helps :)
what is the value expression
2( X + 4) - (y * 8)
when x= 1/8
and y= 3/16
Answer:17/4
Step-by-step explanation:
Solution:
Your problem → 2((1/8)+ 4) - ((3/6)*8)
2((18)+4)-((36)⋅8)
=2⋅(1/8)+4-((36)⋅8)
=2⋅(1+4×8)/8-((36)⋅8)
=2⋅(1+32)/8-((36)⋅8)
=2⋅(33/8)-((36)⋅8)
=2⋅(33/8)-((36)⋅8)
=(33/4)-((36)⋅8)
=(33/4)-(36⋅8)
=(33/4)-(12⋅8)
=(33/4)-12⋅8
=(33/4)-4
=(33/4)-4
=(33-4×4)/4
=(33-16)/4
=17/4
=4.25 (in decimal)
Step-by-step explanation:
HI, PLEASE HELP IM STRUGGLING SO MUCH! thank you!
A restaurant makes smoothies in batches of 6.4 litres.
The smoothies are made from ice cream and a mixed fruit juice in the ratio 5:3. 35% of the juice is lime juice.
Work out the maximum number of batches of smoothie that can be made from 42 litres of lime juice.
If a restaurant makes smoothies in batches of 6.4 litres. the maximum number of batches of smoothie that can be made from 42 litres of lime juice is 50.
What is the maximum number of batches of smoothie?If the ratio of ice cream to mixed fruit juice is 5:3, then,
Fraction of the smoothie that is ice cream =5/(5+3) = 5/8
Fraction that is mixed fruit juice = 3/(5+3) = 3/8
If 35% of the mixed fruit juice is lime juice, then,
Fraction of the mixed fruit juice that is lime juice= 35/100 = 7/20
Fraction of the smoothie that is lime juice = (3/8) x (7/20) = 21/160
To make one batch of smoothie, we need 6.4 litres of mixed fruit juice, of which (21/160) x 6.4 = 0.84 litres is lime juice.
To make 42 litres of lime juice, we nee:
42/0.84 = 50 batches of smoothie.
Therefore, the maximum number of batches of smoothie that can be made from 42 litres of lime juice is 50.
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Which of the following situations can be modeled with a periodic function?
the height of a football after it has been thrown
the height of a person riding on an escalator
the height of a building after it has been constructed
the height of a pebble stuck in the tread of a tire
The correct situation which can be modeled with a periodic function is,
⇒ The height of a pebble stuck in the tread of a tire.
What is mean by Function?A relation between a set of inputs having one output each is called a function. and an expression, rule, or law that defines a relationship between one variable (the independent variable) and another variable (the dependent variable).
Now, The situations that can be modeled with a periodic function is that,
The height of a pebble stuck in the tread of a tire.
And, A function is said to be periodic if it gives same value after a same period. And functions which are not periodic are called aperiodic.
Thus, The correct situation which can be modeled with a periodic function is,
⇒ The height of a pebble stuck in the tread of a tire.
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Rewrite the following polynomial in standard form. -x^5+\frac{1}{5}+x^3 −x 5 + 5 1 +x 3
The given polynomial is x⁵ + (1/5)x³ - x⁵ - x + 5 + x³, Combining the like terms, we get: 2x⁵ + (6/5)x³ - x + 5 This is the polynomial in standard form.
To rewrite the given polynomial in standard form, we first need to combine the like terms. The polynomial can be simplified by adding the coefficients of the same degree terms. After combining like terms, we get -2x⁵ + (6/5)x³ - x + 5. This is the standard form of the polynomial, where the terms are arranged in descending order of degree, and each term has a coefficient multiplied by a power of x. In this case, the highest degree term is -2x⁵, followed by (6/5)x³, -x, and finally, the constant term 5.
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Complete Question
Rewrite the following polynomial in standard form. -x⁵ + (1/5)x³ - x⁵ - x + 5 + x³
guys can you help me with this I do not understand this!
Answer: 24 green
Step-by-step explanation:
3 red for every 4 green, so three goes into 18 six times. Multiply four (green) by six, and you get 24. Sorry if the explanation doesn't help
Write in terms of i. Simplify your answer as much as possible. −13
In terms of i the imaginary root of √−13 is √13i as we know that √(-1) is represented by 'i'.
In mathematics, an imaginary root (also known as a complex root) is a root of a polynomial equation that involves the imaginary unit 'i'. The imaginary unit is defined as the square root of -1, and it is represented by the letter 'i'. A polynomial equation can have either real roots, imaginary roots, or both.
To write √(-13) in terms of 'i', we can start by expressing it as:
√(-1) x √(13) x √(1)
We know that √(-1) is represented by 'i', so we can substitute it in the expression:
'i' x √(13) x √(1)
Since √(1) is equal to 1, we can remove it from the expression:
'i' x √(13)
Therefore, the answer for √(-13) in terms of 'i' is 'i'√(13), which is the simplified form.
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The question is -
Write in terms of i. Simplify your answer as much as possible √−13.
How will the product change if it be number is decreased by a factor of two and the other is decreased by a factor of eight?
Answer:
Assuming you're referring to a product of two numbers, if one number is decreased by a factor of two and the other is decreased by a factor of eight, the overall effect on the product will depend on the relative values of the two numbers.
Let's say the product is given by P = a * b, where a and b are the two numbers. If we decrease one number by a factor of two, we can write it as 0.5a. Similarly, if we decrease the other number by a factor of eight, we can write it as 0.125b. So the new product, P', can be written as:
P' = (0.5a) * (0.125b)
= 0.0625ab
So the new product will be 1/16th (0.0625) of the original product. This means that the product will be decreased by a factor of 16.
In other words, if you decrease one number by a factor of two and the other by a factor of eight, the resulting product will be 16 times smaller than the original product.
Rita is proving that the following trigonometric identity is true: cos(−θ)sin(−θ)=−1tanθ which step would be the first line of her proof?
Hence, in answering the stated question, we may say that We may now trigonometry compare the two sides and observe that they are equal, demonstrating the provided identity.
what is trigonometry?Trigonometry is the field of mathematics that explores the connection between triangle side lengths and angles. Owing to the application of geometry in astronomical research, the topic originally originated in the Hellenistic era, beginning in the third century BC. The subject of mathematics known as exact techniques is concerned with certain trigonometric functions and their possible applications in calculations. Trigonometry contains six commonly used trigonometric functions. Their separate names and acronyms are sine, cosine, tangent, cotangent, secant, and cosecant (csc). Trigonometry is the study of triangle characteristics, particularly those of right triangles. As a result, geometry is the study of the properties of all geometric forms.
The first stage in Rita's evidence would be determined by the method she uses to verify her identity. Nonetheless, one alternative method to begin the proof is to use the trigonometric identities:
sin(-θ) = -sin(θ) and cos(-θ) = cos(θ)
Applying these identities, we can rewrite the given equation's left side as:
sin(-) cos(-) = cos() (-sin())
After that, we may employ the following identity:
tan( ) = sin( )/cos( )
to rewrite the following equation's right side as:
-1 tan() = -sin()/cos()
We may now compare the two sides and observe that they are equal, demonstrating the provided identity.
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I can use models to multiply a fraction by a whole number.
Answer:
yes
Step-by-step explanation:
Answer:
Step-by-step explanation:
Gift Baskets The Gift Basket Store has the following premade gift baskets containing the following combinations in stock Cookies Mugs Candy Coffee 20 22 16 Tea 21 16 21 Send data to Excel Choose l basket at random. Find the probability that it contains the following combinations Enter your answers as fractions or as decimals rounded to 3 decimal places. Part 1 of 3 (a) Coffee or cookles P(coffee or cookies) = 0.681 Part: 1/3 Part 2 of 3 (b) Tea, given that it contains mugs P (tea, given that it contains mugs) -
The probability of coffee or cookies is 0.456, and the probability of tea given that it contains mugs is 0.727.
The probability of an event occurring is the number of successful outcomes divided by the total number of possible outcomes. In this case, we are asked to find the probability of two different combinations: coffee or cookies, and tea given that it contains mugs.
Part 1 of 3:
(a) Coffee or cookies
To find the probability of coffee or cookies, we need to add the probability of coffee and the probability of cookies, and then subtract the probability of both occurring. The probability of coffee is 16/79, and the probability of cookies is 20/79.
The probability of both occurring is 0, since there are no gift baskets that contain both coffee and cookies. So, the probability of coffee or cookies is:
P(coffee or cookies) = P(coffee) + P(cookies) - P(coffee and cookies)
P(coffee or cookies) = 16/79 + 20/79 - 0
P(coffee or cookies) = 36/79
P(coffee or cookies) ≈ 0.456
Part 2 of 3:
(b) Tea, given that it contains mugs
To find the probability of tea given that it contains mugs, we need to use the formula for conditional probability:
P(A|B) = P(A and B)/P(B)
In this case, A is the event of tea, and B is the event of mugs. The probability of tea and mugs is 16/79, and the probability of mugs is 22/79. So, the probability of tea given that it contains mugs is:
P(tea| mugs) = P(tea and mugs)/P(mugs)
P(tea| mugs) = (16/79)/(22/79)
P(tea| mugs) = 16/22
P(tea| mugs) = 8/11
P(tea| mugs) ≈ 0.727
Therefore, the probability of coffee or cookies is 0.456, and the probability of tea given that it contains mugs is 0.727.
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7/8/2+3 1/12
please answer who ever answer first will get brainliest
Rewrite sin^2 (x) cos^2 (x) in expanded form, with no powers, parentheses or products.
cos^2(x) - cos^4(x)
sin^2 (x) cos^2 (x) can be written as sin^2 (x) cos^2 (x) = (1-cos^2(x)) cos^2(x)Expanding (1-cos^2(x)) cos^2(x) gives - cos^4(x) + cos^2(x)Therefore, sin^2 (x) cos^2 (x) in expanded form, with no powers, parentheses or products is cos^2(x) - cos^4(x).
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What is the value of the expression 962 +2c-5
when b=5 and c=4
Answer:
960
Step-by-step explanation:
Assignment Scoring Your last submission is used for your score. 1. + -/1 points SPreCalc7 3.7.033. My Notes Solve the inequality. (Enter your answer using interval notation.) 72 - 72 > 1 X-1 X Need Help? Read It Talk to a Tutor 2. + -/1 points SPreCalc7 3.7.037. My Notes Find all values of x for which the graph of Flies above the graph of g. (Enter your answer using interval notation.) f(x) = x2; 9(x) = 2x + 48 Need Help? Read It Talk to a Tutor 3. -/1 points SPreCalc7 3.7.041. My Notes Find the domain of the given function. (Enter your answer using interval notation.) f(x) = 72 + x - x2
domain of the function is (-∞, ∞)
When answering questions on the Brainly platform, it is important to always be factually accurate, professional, and friendly. In addition, you should be concise and provide a step-by-step explanation in your answer. Irrelevant parts of the question should be ignored, and the following terms should be used in your answer.To solve the inequality 72 - 72 > 1 X-1 X, we need to simplify the inequality as shown below:72 - 72 > 1 X-1 X0 > X - 1Since we want to get X alone on one side of the inequality, we need to add 1 to both sides:0 + 1 > X - 1 + 1X > 0Thus, the solution to the inequality 72 - 72 > 1 X-1 X is (0, ∞).To find all values of x for which the graph of f(x) = x² flies above the graph of g(x) = 2x + 48, we need to solve the inequality:f(x) > g(x)x² > 2x + 48We can rearrange this inequality as follows:x² - 2x > 48Now, we need to factor the left-hand side of the inequality:x(x - 2) > 48The inequality will be satisfied if x > 0 and x - 2 > 0 (i.e. x > 2), so the solution to the inequality is x > 2.The domain of the given function f(x) = 72 + x - x² is all real numbers, since there are no restrictions on the input value x. Therefore, the domain of the function is (-∞, ∞).
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Find a function r(t) that describes the following curve. A circle of radius 6 centered at (4,3,0) that lies in the plane y = 3 Choose the correct answer below. O A. r(t) = (4 cos t,3 sin t,6), for Osts 21 OB. r(t) = (4 + 6 cos t,3,6 sin t), for Osts 21 O c. r(t) = (6 cost +4,6 sint +3,0), for Osts 21 OD. r(t) = (4 cost+6,3, sin t+6), for Osts 21 +
Function describing following curve in which a circle of radius 6 centered at (4,3,0) that lies in the plane y = 3 is [tex]r(t) = (6 cos t +4,6 sin t +3,0)[/tex], for Osts 21. Therefore the correct answer is Option c.
A circle of radius 6 centered at (4,3,0) that lies in the plane y = 3 can be described by the following function:
[tex]r(t) = (6 cost +4,6 sint +3,0), for Osts 21[/tex]
This function describes the position of a point on the circle at any given time t.
The x and z coordinates are determined by the cosine and sine function, respectively, with a radius of 6. The y coordinate is constant at 3, since the circle lies in the plane y = 3. The center of the circle is shifted by adding 4 to the x coordinate and 3 to the y coordinate.
Therefore, the correct answer is Option c. [tex]r(t) = (6 cost +4,6 sint +3,0),[/tex] for Osts 21.
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Determine the equation of the circle with radius 5 and center (-5.-6).
The equatiοn οf the circle is [tex](x + 5)^2 + (y + 6)^2 = 25[/tex].
The standard fοrm equatiοn οf a circle with radius "r" and center (a, b) is:
[tex](x - a)^2 + (y - b)^2 = r^2[/tex]
In this case, the center is (-5, -6) and the radius is 5. Sο, we can substitute these values intο the standard fοrm equatiοn and get:
[tex](x - (-5))^2 + (y - (-6))^2 = 5^2[/tex]
Simplifying the equatiοn, we get:
[tex](x + 5)^2 + (y + 6)^2 = 25[/tex]
Therefοre, the equatiοn οf the circle is [tex](x + 5)^2 + (y + 6)^2 = 25.[/tex]
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A rectangle park is 45m long and 30m wide. A path 2.5m wide is constructed outside the park. Find the area of the path
Answer:
A rectangle park is 45m long and 30m wide. A path 2.5m wide is constructed outside the park. Find the area of the path
Step-by-step explanation:
A rectangle park is 45m long and 30m wide. A path 2.5m wide is constructed outside the park. Find the area of the path
Answer this question
Since opposite angles of a parallelogram are equal, angle A = angle C and angle B = angle D where x is 35.
What is parallelogram?
A parallelogram is a four-sided flat shape in which opposite sides are parallel and have the same length. It is a type of quadrilateral, which means it has four sides.
The opposite angles of a parallelogram are also equal, which means that if angle A is equal to angle C, then angle B is equal to angle D. Moreover, the adjacent angles of a parallelogram are supplementary, which means that if angle A and angle B are adjacent angles, then angle A + angle B = 180 degrees.
According to the question:
Since AB = CD and angle A is 60 degrees, it means that opposite sides AB and CD are parallel and have the same length. Therefore, the figure ABCD is a parallelogram.
To determine the value of angle B, we can use the fact that the opposite angles in a parallelogram are equal. That is, angle B = angle D.
Since angle A + angle B + angle C + angle D = 360 degrees for any quadrilateral, we can write:
angle A + angle B + angle C + angle D = 60 + (3x+15) + angle C + angle D = 360
Simplifying this equation, we get:
4x + 75 + angle C + angle D = 360
angle C + angle D = 360 - 4x - 75 = 285 - 4x
Since angle B = angle D, we have:
angle B + angle D = 2 angle D = (3x+15)
Therefore, we can solve for angle D:
2 angle D = (3x+15)
angle D = (3x+15)/2
Now, we can substitute this into the equation for angle C + angle D:
angle C + (3x+15)/2 = 285 - 4x
Multiplying both sides by 2, we get:
2 angle C + 3x + 15 = 570 - 8x
Simplifying and solving for angle C, we get:
2 angle C = 555 - 11x
angle C = (555 - 11x)/2
Therefore, the angles of the parallelogram ABCD are:
angle A = 60 degrees
angle B = (3x+15) degrees
angle C = (555 - 11x)/2 degrees
angle D = (3x+15)/2 degrees
Note that since opposite angles of a parallelogram are equal, angle A = angle C and angle B = angle D.
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Q. Determine the figure given below which has Angle A= 60 and Angle B=(3x+15)
Melvin Small typed 485 business letters. The cost of writing these letters was estimated to be $3,455. 25. What was the average cost of a letter to the nearest cent
The average cost of a letter was 7.11.
The average cost of a letter can be calculated using the following formula:
Average cost per letter = Total Cost / Number of Letters
In this instance, the average cost of a letter is 7.11 (rounded to the nearest cent):
Average cost per letter = 3,455 / 485
Average cost per letter = 7.11
To calculate the average cost of a letter, we used a simple formula. The total cost was divided by the total number of letters to get the average cost per letter. This amount was then rounded to the nearest cent to get the final answer of 7.11.
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A town has 2 fire engines operating independently. The probability that a specific fire engine is available when needed is 0.96.a) What is the probability that neither is available when needed?b) What is the probability that a fire engine is available when needed?
a) The probability that neither fire engine is available when needed is 0.0016. b) The probability that a fire engine is available when needed is 0.9984.
The probability of an event occurring is the likelihood that it will happen. In this case, we are looking at the probability of a specific fire engine being available when needed.
The probability that neither fire engine is available when needed can be found by multiplying the probabilities of each fire engine not being available. The probability of a specific fire engine not being available is [tex]1 - 0.96 = 0.04[/tex]. So the probability that neither is available is [tex]0.04 * 0.04 = 0.0016.[/tex]
The probability that a fire engine is available when needed can be found by subtracting the probability that neither is available from 1. So the probability that a fire engine is available when needed is[tex]1 - 0.0016 = 0.9984.[/tex]
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Triangle FUN has vertices located at F (-2,-3), U(4,2), and N(1,2). Part A: Find the leght of UN.
Please Hurry!
Select the correct answer. What is the solution to the equation? -2x - 5 - 4 =z A. -7 and -3 B. 3 and 7 C. -3 D. 7
The solution to the equation √(-2x - 5) - 4 = x are x = -7 and x = -3
How to determine the solution to the equationFrom the question, we have the following parameters that can be used in our computation:
√(-2x - 5) - 4 = x
So, we have
-2x - 5 = x + 4
Take the square of both sides
so, we have the following representation
x² + 8x + 16 = -2x - 5
Evalyate the like terms
x² + 10x + 21 = 0
When factorized, we have
(x + 7)(x + 3) = 0
This means that
x = -7 and x = -3
Hence, the solutions are x = -7 and x = -3
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Assume that the masses of adult men can be modelled by the Normal
distribution with mean 75 kg and standard deviation 5 kg.
The probability that an adult man, chosen at random, will have a mass greater
than 77. 5 kg is
(4 d. P. )
The probability that an adult man, chosen at random, will have a mass between
76. 6 kg and 83. 5 kg is
(4 d. P. )
62% of adult men have a mass greater than
kg (1 d. P. )
The interquartile range for the masses of adult men is
kg (1 d. P. )
The interquartile range for the masses of adult men is 6.75 kg (1 decimal place).
The probability that an adult man, chosen at random, will have a mass greater than 77.5 kg is 0.4 (4 decimal places). The probability that an adult man, chosen at random, will have a mass between 76.6 kg and 83.5 kg is 0.2366 (4 decimal places). 62% of adult men have a mass greater than 78.45 kg (1 decimal place).
Let X be the mass of an adult man, then X ~ N(75, 5^2).
P(X > 77.5) = P(Z > (77.5 - 75) / 5) where Z is the standard normal random variable.
P(Z > 0.5) = 1 - P(Z ≤ 0.5) ≈ 0.3085
Therefore, the probability that an adult man, chosen at random, will have a mass greater than 77.5 kg is approximately 0.3085.
P(76.6 < X < 83.5) = P[(76.6 - 75) / 5 < Z < (83.5 - 75) / 5]
P(1.32 < Z < 1.7) = P(Z < 1.7) - P(Z < 1.32) ≈ 0.0932
Therefore, the probability that an adult man, chosen at random, will have a mass between 76.6 kg and 83.5 kg is approximately 0.0932.
Let p be the proportion of adult men with a mass greater than some value x, then we want to find x such that p = 0.62.
By standardizing and using the standard normal distribution table, we get:
P(Z > (x - 75) / 5) = 0.62
P(Z < (75 - x) / 5) = 0.38
Using the standard normal distribution table, we find that Z ≈ 0.2533
Therefore, (x - 75) / 5 ≈ 0.2533
x ≈ 76.267 kg (rounded to 1 decimal place)
Therefore, 62% of adult men have a mass greater than 76.3 kg.
The interquartile range (IQR) is a measure of spread and is defined as the difference between the 75th percentile and the 25th percentile of the distribution. For a normal distribution, the IQR is approximately 1.35 times the standard deviation.
IQR ≈ 1.35 * 5 ≈ 6.75 kg (rounded to 1 decimal place)
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Determine the number of ways to perform the task described.
Three-players are to be selected from a 13-player baseball team to visit schools to support a summer reading program. In how many ways can this selection be made.
There are ____ different ways 3 players can be selected from a 13 player baseball toam. (Simplify your answer. Type a whole number)
There are 286 different ways to select 3 players from a 13-player baseball team to visit schools to support a summer reading program.
This is a combination problem, where we want to select 3 players from a team of 13 players, without regard to order.
The number of ways to select r items from a set of n distinct items is given by the combination formula:
C(n, r) = n! / (r!(n-r)!)
where n is the total number of items and r is the number of items to be selected.
In this case, we want to select 3 players from a team of 13 players, so we can use the combination formula:
C(13, 3) = 13! / (3!(13-3)!) = (13 x 12 x 11) / (3 x 2 x 1) = 286
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A family buys 4 airline tickets online. The family buys travel insurance that costs $19 per ticket. The total cost is $724. Let x represent the price of one ticket. Write an equation for the total cost. Then find the price of one ticket.
Answer:
total cost equation = ( 9+x) times 4 = 724. Total,price of a ticket is 162$
Step-by-step explanation:
Since insurance for each ticket costs 19$ and the family bought four and the ticket itself costs x, the costs of the four tickets is (19+x) times 4. If thr total cost is 724 then we can take 19 times4 and subtract that from it because 19times 4 + x times 4 is the same as (19+x) times 4. From this we fet 648. Now we have x4 or x times 4 = 648 leftover, so divided 648 by 4 to get one x out of it since it is made up of four x. You get 162 from this, so the price of a ticket without insurance is 162$