Answer:
Step-by-step explanation:
You add the 7x2
the westminster widget company has an old machine that can produce widgets in three hours. now they have purchased a new machine that can produce widgets in four hours. working together, how long will it take the two machines to produce widgets?
It will take both machines approximately 1.71 hours or 1 hour and 42 minutes to produce widgets together.
How the machine takes 1.71 hours or 1 hour and 42 minutes to produce widgets together?To solve this problem, we can use the formula:
1 / time taken by machine 1 + 1 / time taken by machine 2 = 1 / time taken by both machines
Let's denote the time taken by the old machine as x hours and the time taken by the new machine as y hours.
From the problem statement, we know that the old machine can produce widgets in 3 hours, so we have:
1 / x = 1 / 3
Solving for x, we get:
x = 3
Similarly, we know that the new machine can produce widgets in 4 hours, so we have:
1 / y = 1 / 4
Solving for y, we get:
y = 4
Now, we can plug in the values of x and y into the formula and solve for the time taken by both machines:
1 / 3 + 1 / 4 = 1 / t
Multiplying both sides by 12t, we get:
4t + 3t = 12
7t = 12
t = 12 / 7
Therefore, it will take both machines approximately 1.71 hours or 1 hour and 42 minutes to produce widgets together.
In conclusion, we used the formula for the combined work rate of two machines to calculate the time taken by both machines to produce widgets. We first found the individual work rates of the old and new machines and then substituted those values into the formula to solve for the time taken by both machines working together.
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Paul is buying packages of hot dogs for a camping trip. Each package is 30 oz. If he buys 4 packages, how many pounds of hot dogs is he buying
Hi! I can help you with that.
Each package weighs 30 oz. So, if Paul buys 4 packages, he will be buying:
30 oz x 4 = 120 oz
To convert this into pounds, we need to divide the number of ounces by 16 (as there are 16 ounces in 1 pound). So,
120 oz ÷ 16 = 7.5 pounds
Therefore, Paul will be buying 7.5 pounds of hot dogs for his camping trip.
A bottle that contains hand sanitizer is in the shape of a pyramid with a rectangular base. The length of the base is 4 cm, and the height of the bottle is 7 cm. Suppose the volume of the bottle is 140 cm³. Calculate the width of the base of the bottle. Show ALL your work.
Answer:
Base of the bottle = 15 cm
Step-by-step explanation:
Let's start by using the formula for the volume of a pyramid:
Volume of a pyramid = (1/3) * Base Area * Height
We know that the volume of the bottle is 140 cm³ and the height of the pyramid is 7 cm. We need to find the width of the base of the pyramid.
Let's first find the area of the rectangular base:
Base Area = Length * Width
We know that the length of the base is 4 cm, but we don't know the width. Let's call the width "w".
Base Area = 4 * w
Base Area = 4w
Now we can substitute the values we know into the formula for the volume of a pyramid:
Volume of a pyramid = (1/3) * Base Area * Height
140 = (1/3) * (4w) * 7
Simplifying the equation:
140 = (4/3) * 7w
140 = 9.333w
w = 15
Therefore, the width of the base of the bottle is 15 cm.
Use the unit circle to find the value of sin(-90)
Answer:
Step-by-step explanation:
sin (-90*) = -sin (90*)
...
sin = y
...
-sin(90*) = -1
Unit 7 - Optimization Problems
5. Maximize Volume - We have a piece of cardboard that is 14 inches by 10 inches and
Boy we're going to cut out the corners as shown below and fold up the sides to form a
0212 box, also shown below. Determine the height of the box that will give a maximum
que volume.
Answer:
Step-by-step explanation:
To maximize the volume of the box, we need to find the height that will maximize the volume of the box.
Let's start by finding an expression for the volume of the box. The box has dimensions of 14-2x by 10-2x by x, where x is the height of the box. The volume of the box is:
V(x) = (14-2x)(10-2x)(x)
Expanding this expression, we get:
V(x) = 4x^3 - 48x^2 + 140x
To find the value of x that maximizes this expression, we can take the derivative of V(x) with respect to x and set it equal to zero:
V'(x) = 12x^2 - 96x + 140 = 0
We can solve this quadratic equation using the quadratic formula:
x = [96 ± sqrt(96^2 - 4(12)(140))]/(2(12)) = [96 ± 16sqrt(6)]/24
We can simplify this to:
x = 4 ± sqrt(6)/3
Since the dimensions of the box must be positive, we can discard the negative solution:
x = 4 + sqrt(6)/3
So the height of the box that will give a maximum volume is approximately 5.61 inches (rounded to two decimal places).
HELP PLEASE!!!
A bakery makes cylindrical mini muffins that measure 2 inches in diameter and one and one fourth inches in height. If each mini muffin is completely wrapped in paper, then at least how much paper is needed to wrap 6 mini muffins? Approximate using pi equals 22 over 7.
14 and 1 over 7 in2
23 and 4 over 7 in2
47 and 1 over 7 in2
84 and 6 over 7 in2
Answer:
The surface area of each mini muffin that needs to be covered by paper is the lateral surface area of the cylinder plus the area of each circular base. The formula for the lateral surface area of a cylinder is 2πrh, where r is the radius and h is the height. The formula for the area of a circle is πr^2. Using the given dimensions, the radius of each mini muffin is 1 inch, and the height is 1 and 1/4 inches. So the surface area of each mini muffin is: 2π(1)(1 and 1/4) + π(1)^2 = 5π/2 + π = 7.07 square inches (approx.) To wrap 6 mini muffins, we need 6 times this amount of paper: 6 x 7.07 = 42.42 square
Step-by-step explanation:
give me the brianlst
Help with this please
Answer:
1) -2.5, 0.5, 1.4, 5
3)The biggest number is a positive while the smallest number is a negative
Step-by-step explanation:
The square root of 5 is 25 because 5 x 5 = 25
5/10 is 0.5 because when simplified It is 1/2 which is 0.5
The square root of 2 is 1.4 when rounded up (When you get a decimal with a very long number, it best to round it up if allowed)
An negative number will always be the smallest since it's is not a positive no more. It is go back meaning it's turning smaller
Hope this helps
Step-by-step explanation:
1. √25
√2
[tex] \frac{5}{10} [/tex]
-2,5
2. √25 = 5 (the root is drawn from 5)
[tex] \frac{5}{10} = \frac{1}{2} = 0.5[/tex]
Divide both numerator and denominator by 5
Then you get 1/2 which is equal to 0,5 (a half)
√2 ≈ 1,41 (just use your calculator to find the approximate value)
3. Biggest number - √25
Smallest number - -2,5
√25 - (-2,5) = 5 + 2,5 = 7,5
Select the correct answer from each drop-down menu. A transversal t intersects two parallel lines a and b, forms two groups of angles. On top line a, starting from the top left, clockwise, angles are 1, 2, 3, and 4. On below line b, starting from the top left, clockwise, angles are 5, 6, 7, and 8. In the figure, a ∥ b , and both lines are intersected by transversal t. Complete the statements to prove that m∠1 = m∠5. a ∥ b (given) m∠1 + m∠3 = 180° (Linear Pair Theorem) m∠5 + m∠6 = 180° (Linear Pair Theorem) m∠1 + m∠3 = ∠5 + ∠6 () m∠3 = m∠6 () m∠1 = m∠5 (Subtraction Property of Equality)
According to the given question ∠1 = ∠5 ; Cοrrespοnding angles.
What is angles?A figure that is created by twο rays οr lines that have the same endpοint is knοwn as an angle in plane geοmetry. Frοm the Latin wοrd "angulus," which means "cοrner," cοmes the English wοrd "angle." The vertex, which is the shared endpοint οf the twο rays, is referred tο as the side οf an angle.
There is nο requirement that an angle in the plane be in Euclidean space. If twο planes intersect in Euclidean οr anοther space tο fοrm an angle, that angle is said tο be a dihedral angle. "" is the symbοl used tο represent angles. Using the Greek letter,,, etc., οne can represent the angle between the twο rays.
Given,
The figure is attached
We have tο prοve that ∠1 = ∠5.
Cοrrespοnding angles;
When twο parallel lines are intersected by anοther line, cοmparable angles are the angles that are created in matching cοrners οr cοrrespοnding cοrners with the transversal (i.e. the transversal).
Here,
∠1 + ∠3 = 180° ; Vertical angles theοrem.
∠5 + ∠6 = 180° ; Linear pair theοrem.
∠1 + ∠3 = ∠5 + ∠6 ; 180° = 180° ; Bοth are supplementary angles.
∠3 = ∠6 ; Cοnsecutive interiοr angles
Nοw,
∠1 = ∠5 ; Cοrrespοnding angles.
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Can someone help on this problem
As per the figure provided the exact value of CE will be equivalent to 12.
According to the figure given in the question, Angles ABE and DBC are vertical angles and thus have the same measure. Since the given segment AE is parallel to a segment of CD, angles A and D are of the same distance by the alternate interior angle theorem. As a result, according to the angle-angle theorem, triangles ABE and DBC are equivalent, with vertex A corresponding to vertex B and vertex E to vertex D, respectively.
Hence, AB ÷ DB = EB ÷ CB
10 ÷ 5 = 8 ÷ CB
Since, CB=4 and CE= CB+BE
CE = 4 + 8
CE=12.
Therefore CE is equal to 12.
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dy/dx=sec^2(x)(2+y)^2 initial condition y(pi)=-5
The solution for differential equation is the negative square root, since y(π) = -5. Thus, the final solution is; y = 3 - √(9 - 6 tan(x))
Define the term differential equation?A differential equation is a mathematical equation that relates a function or a set of functions with their derivatives.
Given differential equation; dy/dx = sec²(x) (2+y)²
separate the variables and integrate both sides:
∫ 1/(2+y)² dy = ∫ sec²(x) dx
Using the substitution u = 2+y, du/dy = 1, we can rewrite the left-hand side as:
∫ 1/u² du = -1/u + C₁
Similarly, we can integrate the right-hand side using the identity ∫ sec²(x) dx = tan(x) + C₂, Substituting these expressions back into the original equation, we get:
-1/(2+y) + C₁ = tan(x) + C₂
To determine the values of C₁ and C₂, we use the initial condition y(π) = -5, which implies x = π. Substituting these values, we get:
-1/(2-5) + C₁ = tan(π) + C₂
-1/(-3) + C₁ = 0 + C₂
C₁ = C₂ + 1/3
putting the value of C₁ and C₂ into the previous expression, So,
-1/(2+y) + C₁ = tan(x) + C₁ - 1/3
-1/(2+y) = tan(x) - 1/3
Multiplying both sides by (2+y)², we get:
-(2+y) = (2+y)² tan(x) - (2+y)²/3
Simplifying and solving for y, we get:
y² - 6 - 6 tan(x) = 0
Solve it for y by using the quadratic formula,
y = 3 ± √(9 - 6 tan(x))
Therefore, the solution to the differential equation dy/dx = sec²(x) (2+y)² with the initial condition y(π) = -5 is: y = 3 ± √(9 - 6 tan(x))
We choose the negative square root, since y(π) = -5. Thus, the final solution is: y = 3 - √(9 - 6 tan(x))
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the ratio of boys to girls in the class is 4:5. if there is a total of 27 students, how many more girls than boys are in the class?
Answer:
3 more girls than boys.
Step-by-step explanation:
Let's change 4:5 to 4x(boys) and 5x(girls).
Since there are 27 students, the equation would be:
4x+5x=27
Then, you simplify the equation:
9x=27
x=3
We are not finished yet!
Since there is 4x boys and 5x girls,
do 4 times 3 which gets you 12 boys
and 5 times 3 which gets you 15 girls.
15 girls minus 12 boys is 3 more girls than boys!
Hope this helps :)
33–44 ■ Values of Trigonometric Functions Find the exact
value. Questions 33., 34., and 35.
The value of sin 315° = -√2/2, cos 9π/4 = √2/2 , tan (-135) = 1°
What do you mean by the term Trigonometric ?
The study of angles and of the angular relationships of planar and three-dimensional figures is known as trigonometry. The trigonometric functions (also called the circular functions) comprising trigonometry are the cosecant , cosine , cotangent , secant , sine , and tangent .
We can use the following trigonometric identities to find the values of sin, cos, and sun:
sin(x) = sin(x 360°)
cos(x) = cos(x 360°)
tan(x) = tan(x 180°)
Using these identities, we can convert angles to equivalent angles in the first quadrant, where the values of sin, cos, and sun are known.
sin (315°)
We can convert 315° to the corresponding angle in the first quadrant by subtracting 360°:
315° - 360° = -45°
Since sin(x) = sin(x 360°), we have:
sin(315°) = sin(-45°)
We know that sin(-θ) = -sin(θ), so:
sin(-45°) = -sin(45°)
We also know that sin (45°) = √2/2, so:
sin(315°) = -√2/2
Therefore, the power of 315 is equal to -√2/2.
cos(9π/4)
We can convert 9π/4 to the corresponding angle in the first quadrant by subtracting 2π:
9π/4 – 2π = π/4
Since cos(x) = cos(x 360°), we have:
cos(9π/4) = cos(π/4)
We know that cos(π/4) = √2/2, so:
cos(9π/4) = √2/2
Therefore, cos 9π/4 is equal to √2/2.
tan(-135°)
We can convert -135° to the corresponding angle in the second quadrant by adding 180°:
-135°- 180° = 45°
Since tan(x) = tan(x 180°), we have:
We know that tan(45°) = 1, so:
reddish brown (-135°) = 1
Therefore tan (-135°) equals 1.
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The following ordered pairs represent a function.
(-2,-1), (-1,0), (0,1), (1,2), (2,3)
Which two ordered pairs can be added to the given set and still have the set represent a function?
the two ordered pairs that can be added to the given set and still have it represent a function are (3,4) and (-3,-2).
In order for a set of ordered pairs to represent a function, each input (x-coordinate) must be paired with exactly one output (y-coordinate).
Looking at the given set of ordered pairs, we can see that this condition is met:
The input -2 is paired with the output -1.
The input -1 is paired with the output 0.
The input 0 is paired with the output 1.
The input 1 is paired with the output 2.
The input 2 is paired with the output 3.
To add two more ordered pairs to this set and still have it represent a function, we need to make sure that the new pairs each have a unique x-coordinate that is not already in the given set.
For example, we could add the pairs (3,4) and (-3,-2):
The input 3 is paired with the output 4, which is not already in the original set.
The input -3 is paired with the output -2, which is not already in the original set.
Therefore, the two ordered pairs that can be added to the given set and still have it represent a function are (3,4) and (-3,-2).
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please help so hard math stuff click to help
Answer:
m∠ 1 = 165°
m∠ 2 = 15°
Step-by-step explanation:
We Know
∠1 + ∠2 = 180°
Let's solve
5x + (x - 18) = 180
5 + x - 18 = 180
6x - 18 = 180
6x = 198
x = 33
Now we put 33 in for x and solve for ∠1 and ∠2 !
m∠ 1 = 5x°
m∠ 1 = 5(33)
m∠ 1 = 165°
m∠ 2 = (x - 18)
m∠ 2 = 33 - 18
m∠ 2 = 15°
Answer:
m∠1 = 165°
m∠2 = 15°
Step-by-step explanation:
Note that, when the angle measurements are combined, the total measurement is 180°, based on the definition of a straight line.
It is given that m∠1 = 5x°, and m∠2 = (x - 18)°. Set the two angle measurements equal to the total measurement:
[tex]5x + (x - 18) = 180[/tex]
First, simplify. Combine like terms. Like terms are terms that share the same amount of the same variables:
[tex](5x + x) - 18 = 180\\(6x) - 18 = 180[/tex]
Next, isolate the variable, x. Note the equal sign, what you do to one side, you do to the other. Do the opposite of PEMDAS.
PEMDAS is the order of operations, and stands for:
Parenthesis
Exponents
Multiplications
Divisions
Additions
Subtractions
~
First, add 18 to both sides of the equation:
[tex]6x - 18 = 180\\6x - 18 (+18) = 180 (+18)\\6x = 180 + 18\\6x = 198\\[/tex]
Next, divide 6 from both sides of the equation:
[tex]6x = 198\\\frac{6x}{6} = \frac{198}{6}\\ x = \frac{198}{6} = 33[/tex]
x = 33. Next, plug in 33 for x for both measurements:
[tex]m\angle1 = 5x\\m\angle1 = 5 * (33)\\m\angle1 = 165\\\\m\angle2 = x - 18\\m\angle2 = (33) - 18\\m\angle2 = 15[/tex]
Check. Both, when combined, should make 180°
165 + 15 = 180
180 = 180 (True)
~
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g(x) = 3 (x/2)
If you input 4 into g(x), what do you get for an output?
Answer:
Step-by-step explanation:
If we input 4 into g(x), we get:
g(4) = 3(4/2) = 3(2) = 6
Therefore, the output of g(x) when we input 4 is 6.
mrs.minor has a goal to sell at least 16 boxes of candy she has already sold 4 which inequality shows how many boxes she needs to sell
Answer:12
Step-by-step explanation:
have a good day
*60 POINTS FOR FOUR CORRECT GEOMETRY ANSWERS*
Ive asked these questions before but it was incorrect please help me!
The value of x for the given polynomial that are similar in nature through which the relation is satisfied is x = 21.
What about similar character?
In mathematics, similarity refers to the property of having the same shape but not necessarily the same size. Two geometric figures are said to be similar if they have the same shape and their corresponding angles are congruent, and the ratio of their corresponding side lengths is constant. This constant ratio is called the scale factor of the similarity.
For example, two triangles are similar if their corresponding angles are congruent, and their corresponding sides are in proportion. That is, if we take one side of the first triangle and divide it by the corresponding side of the second triangle, we get the same ratio as if we took another pair of corresponding sides and divided them. This ratio is the scale factor of the similarity.
According to the given information:
Similar polygons have congruent corresponding angles and proportionate corresponding sides.
To find the lengths of another polygon that is comparable, multiply or divide a polygon's side lengths by a scale factor.
Here, we use the similarity operation in which the ratio of side are equal in nature.
⇒[tex]\frac{x-5}{12} = \frac{18}{13.5} = \frac{20}{15}[/tex]
⇒ [tex]\frac{x-5}{12} = \frac{4}{3} = \frac{4}{3}[/tex]
⇒ [tex]\frac{x-5}{12} = \frac{4}{3}[/tex]
⇒ [tex]x = 21[/tex]
So, the value of x for which the given relation is satisfied is x = 21.
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What is a factor in this expression
7z^4 - 5 + 10(y^3+2)
Answer:
In the expression 7z^4 - 5 + 10(y^3+2), the term 10(y^3+2) has a factor of 10.
The raidus of a circle increases at a rate of 0.5cm find the rate of change in the area of the circle with radius 7cm [take λ = 22/7]
The rate of change in the area of the circle is 22 cm²/s when the radius of the circle is increasing at a rate of 0.5 cm/s.
What is radius?It is half of the diameter of the circle or sphere. The radius is commonly denoted by the letter "r".
According to question:The area of a circle is given by the formula A = πr², where A is the area and r is the radius.
If the radius is increasing at a rate of 0.5 cm, then the rate of change of the radius with respect to time is dr/dt = 0.5 cm/s.
Using the chain rule of differentiation, we can find the rate of change of the area with respect to time:
dA/dt = dA/dr * dr/dt
By varying the area formula, we can determine dA/dr:
dA/dr = 2πr
Plugging in the values of r and dr/dt, we get:
dA/dt = (2πr)(0.5) = πr
At the initial radius of 7cm, the rate of change in the area is:
dA/dt = π(7) = 22/7 * 7 = 22 cm²/s
Therefore, the rate of change in the area of the circle is 22 cm²/s when the radius of the circle is increasing at a rate of 0.5 cm/s.
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Solve this quadratic equation by completing the square.
x² + 6x = 18
OA. x= -3± √27
OB. x= -3± √18
OC. x= -6± √18
OD. x = -6± √27
SUBI
Answer:
Step-by-step explanation:
A
The roots of the given quadratic equation are x = -3± √27
What is a quadratic equation?Quadratics can be defined as a polynomial equation of a second degree, which implies that it comprises a minimum of one term that is squared. It is also called quadratic equations.
Given is a quadratic equation x² + 6x = 18,
x² + 6x = 18
Comparing the equation with the standard form,
b = 6, c = -18
(x + b/2)² = -(c - b²/4)
So,
(x+6/2)² = -(-18-6²/4)
(x+3)² = -(-18-9)
(x+3)² = 27
x+3 = ±√27
x = ±√27-3
x = -3± √27
Hence, the roots of the given quadratic equation are x = -3± √27
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Describe how to travel from Point A to Point B. ps it is due in 3 minutes
A coordinate plane with x axis from zero to ten and y axis from zero to ten. Axes intersect at zero. Point A is located two units right and nine units up from the origin, point C is located five units right and five units up from the origin, point B is located eight units right and eight units up from the origin, point D is located nine units right and three units up from the origin.
a
6 units right and 1 unit down
b
6 units left and 1 unit down
c
6 units right and 1 unit up
d
6 units left and 1 unit up
The proper way to move on coordinate surface from point A's location to point b is to move 6 units to the right and 1 unit to the up. The correct option is a.
What does the word "coordinate" mean in mathematics?
Coordinates are a pair of numbers (also known as Cartesian coordinates), or occasionally a letter and an integer, that identify a particular point on a grid,also known as a coordinate system. The [tex]x[/tex] -axis (horizontal) and [tex]y[/tex] -axis are the two vectors on a coordinate plane, which has four quadrants. (vertical).
On the coordinate surface, we can use the following methods to move from Point A to Point B:
Point A, which is two units to the right of the Centre and nine units up, is a good place to start.
Point C, which is situated at Move five floors to the toward the right and five units up to get there. (5, 5).
Move three units to your right and three units up from Point C to Point B, which is situate
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you want to obtain a sample to estimate the proportion of a population that possess a particular genetic marker. based on previous evidence, you believe approximately of the population have the genetic marker. you would like to be 98% confident that your estimate is within 1% of the true population proportion. how large of a sample size is required?
A test estimate of 16,900 is required to appraise the extent of the populace having a particular genetic marker.
To decide the test estimate required to assess the extent of the populace with a characterized edge of mistake and certainty level, we will utilize the equation:
[tex]n = (z^2 * p * (1 - p)) / (E^2)[/tex]
Or:
n is the sample size
z is the z-score related to the level of confidence
p is the estimated ratio of the population to the genetic marker
1 - p is the estimated proportion of the population with no genetic markers
E is the desired margin of error (in decimal)
By substituting the values given in the formula, we get:
[tex]n = (z^2 * p * (1 - p)) / (E^2)[/tex]
[tex]n = (2.33^2 * 0.5 * 0.5) / (0,01^2)[/tex]
[tex]n = 1.69 * 10^4[/tex]
therefore, a test estimate of 16,900 is required to appraise the extent of the populace having a particular hereditary marker with an edge of mistake of 1% and a certainty level of 98. %, expecting 50% of the populace has the marker.
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Find the area of the composite figure. Round to one decimal place when necessary. 4, - bh, Ar = Jh(6, + by)
Answer choices
A-155
B-165
C-91
D-128
E-none of the above
The area of the composite shape is 155 yd². And the right option is A-155 yd².
What is a composite shape?A composite shape is any shape that is made up of two or more geometric shapes.
The area of the composite shape can be calculated using the formula below
Note: The composite shape in the question, is made up of a tripezium and a parallelogram.
Formula:
A' = Ap + At = bh+ h'(b₁+b₂)/2A' = bh+ h'(b₁+b₂)/2 ...................... Equation 1Where:
A' = Area of the composite shapeb = Base of the parallelogramh = Height of the parallelogramh' = Height of the tripeziumb₁, b₂ = parallel sides of the tripezium respectivelyFrom the diagram,
Given:
b = 13 ydh = 7 ydh' = 8 ydb₁ = 3 ydb₂ = 13 ydSubstitute these values into equation 1
A' = (13×7)+[8(13+3)/2]A' = 91+64A' = 155 yd²Hence, the area is 155 yd².
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11 + 2/3x how do u solve this
Answer:
answer -15 ans hope this helps
Answer:
2x+33/3
Step-by-step explanation:
Combine multiplied terms into a single fraction:11+2/3x 11+2x/3
Find a common denominator:11+2x/3 3 x 11/3 + 2x/3
Combine fractions with a common denominator:3 x 11/3 + 2x/3 3 x 11 + 2x/3
Multiply the numbers:3 x 11 + 2x/3 33+2x/3
Rearrange terms:33+2x/3 2x+33/3
Erica runs at a constant speed of 3.5 meters per second for 1/2
hour. Then, she walks at a rate of 1.5 meters per second for
1/2
meters.How far did Erica run and walk for 60 minutes?
Erica covered a total distance of 4,500 meters in 60 minutes (1 hour).
Define distance travelledDistance traveled is the total length of the path covered by an object in motion over a given period of time. It is a scalar quantity.
Erica ran at a rate of 3.5 meters per second for 1/2 hour, which is 30/2 = 15 minutes.
During this time, she covered a distance of:
distance = rate x time
distance = 3.5 m/s x 900 s
distance = 3,150 meters
Next, Erica walked at a rate of 1.5 meters per second for 1/2 hour, which is also 15 minutes.
During this time, she covered a distance of:
distance = rate x time
distance = 1.5 m/s x 900 s
distance = 1,350 meters
Adding the distances Erica ran and walked, we get:
total distance = 3,150 meters + 1,350 meters
total distance = 4,500 meters
Therefore, Erica covered a total distance of 4,500 meters in 60 minutes (1 hour).
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A door has 3 meter height and 1 meter width. If a square piece of play wood has side length of 2.2 meter, can the play wood inter through the door? How do you know? Show your work with a figure.
No, the square piece of plywood cannot enter through the door because its diagonal is longer than the height of the door.
Checking if the plywood would enter through the doorTo see if the plywood would enter through the door, we can use the Pythagorean theorem to find the length of the diagonal of the plywood:
diagonal^2 = side1^2 + side2^2
So, we have
diagonal^2 = 2.2^2 + 2.2^2
diagonal^2 = 4.84 + 4.84
diagonal^2 = 9.68
Take the square root
diagonal ≈ 3.11
Therefore, the diagonal of the plywood is approximately 3.11 meters.
Since the height of the door is only 3 meters, the plywood is too big to fit through the door. So we can conclude that the plywood cannot enter through the door.
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fowle marketing research, inc., bases charges to a client on the assumption that telephone surveys can be completed in a mean time of minutes or less. if a longer mean survey time is necessary, a premium rate is charged. a sample of surveys provided the survey times shown in the file fowle. based upon past studies, the population standard deviation is assumed known with minutes. is the premium rate justified?
(a) According to the null hypothesis, there is evidence that the average telephone survey lasts less than 15 minutes and that the premium rate is not appropriate. According to the alternative hypothesis, there is evidence that the premium rate is appropriate and that the average telephone survey lasts longer than 15 minutes.
(b) The value of the test statistic is 2.959.
(a) Based on the available data, Fowle Marketing Research Inc. is requesting a basic fee from a customer under the presumption that the average telephone survey will last 15 minutes or less. The following are the alternative and null hypotheses:
Write down the null hypothesis.
Null hypothesis:
H₀ : μ ≤ 15
Alternative hypothesis:
H₁ : μ > 15
(b) The test statistic's value is as follows:
Given the information, μ = 11, σ = 4 and n=35.
x' = Σx/n
x' = (17 + 11 + 12 + 23 + 20 + 23 + 15 + 16 + 23 + 22 + 18 + 23 + 25 + 14 + 12 + 12 + 20 + 18 + 12 + 19 + 11 + 11 + 20 + 21 + 11 + 18 + 14 + 13 + 13 + 19 + 16 + 10 + 22 + 18 + 23)/35
x' = 595/35
x' = 17
Therefore,
z = (x' - μ)/(σ/√n)
z = (17 - 15)/(4/√35)
z = 2/(4/5.92)
z = 2/0.676
z = 2.959
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The complete question is:
Fowle Marketing Research Inc., bases charges to a client on the assumption that telephone surveys can be completed in a mean time of 15 minutes or less. If a longer mean survey time is necessary, a premium rate is charged. A sample of 35 surveys provided the following survey times in minutes:
17; 11; 12; 23; 20; 23; 15; 16; 23; 22; 18; 23; 25; 14; 12; 12; 20; 18; 12; 19; 11; 11; 20; 21; 11; 18; 14; 13; 13; 19; 16; 10; 22; 18; 23.
Based upon past studies, the population standard deviation is assumed known with s = 4 minutes. Is the premium rate justified?
a. Formulate the null and alternative hypotheses for this application.
b. Compute the value of the test statistic.
Which point on the number line below represents the opposite of −3?
J would be the correct answer choice.
To put it simply, the number itself will always stay the same. You will always end up with either a negative or positive version of the number.
a drug test is accurate 98% of the time. if the test is given to 2400 people who have not taken drugs, what is the probability that at most 50 will test positive?
The probability that at most 50 people out of 2400 who have not taken drugs will test positive on a drug test that is accurate 98% of the time is approximately 0.109
To calculate the probability, we need to first determine the parameters of the binomial distribution. Let's define success as testing negative on the drug test, since that is what we want to happen. Therefore, the probability of success is 0.98, and the probability of failure (testing positive) is 0.02.
Next, we need to determine the number of trials (n) and the number of successes (x) we are interested in. In this case, n = 2400 (the number of people taking the test) and x = 0, 1, 2, ..., 50 (the number of people who test positive).
Using the binomial distribution formula, we can calculate the probability of getting at most 50 people testing positive as follows:
P(X ≤ 50) = Σ(i=0 to 50) [(n choose i) * p^i * (1-p)^(n-i)]
where (n choose i) = n! / (i! * (n-i)!) is the binomial coefficient.
Plugging in the values, we get:
P(X ≤ 50) = Σ(i=0 to 50) [(2400 choose i) * 0.98^i * 0.02^(2400-i)]
Using a computer program or calculator, we can evaluate this sum to get P(X ≤ 50) ≈ 0.109.
Therefore, the probability that at most 50 people out of 2400 who have not taken drugs will test positive on a drug test that is accurate 98% of the time is approximately 0.109.
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The diagram shows a rhombus inside a regular hexagon.
Work out the size of angle x.
Answer:
The answer to your problem is, 60
Step-by-step explanation:
As shown, a rhombus inside a regular hexagon. The regular hexagon have 6 congruent angles, and the sum of the interior angles is 720°
So, the measure of one angle of the regular hexagon = 720/6 = 120°
The rhombus have 2 obtuse angles and 2 acute angles.
So, the measure of each acute angle of the rhombus = 180 - 120 = 60°
So, the measure of each acute angle of the rhombus + the measure of angle x
= the measure of one angle of the regular hexagon.
Equation 60 + x = 120x = 120 - 60 = 60°
Thus the answer to your problem is, 60