The probability that the selected marble is red is 0
How to determine the probability that the marble is red?From the question, we have the following parameters that can be used in our computation:
Number of marbles = 10
Blue = 3
Yellow = 7
Using the above as a guide, we have the following:
P(Red) = Number of red/Number of marbles
Substitute the known values in the above equation, so, we have the following representation
P(Red) = 0/10
Evaluate
P(Red) = 0
Hence, the probability is 0
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A full bottle of cordial holds 800 m/ of cordial. A full bottle of cordial is mixed with water to make a drink to take onto a court for a tennis match. When mixed, the drink is put into a container. (c) What is the minimum capacity, in litres, of the container? 1000 m/= 1 litre
Answer:
We are not given the ratio of cordial to water used in the mixture, so we can assume that the entire bottle of cordial is mixed with water to make the drink.
Since the bottle of cordial holds 800 ml of cordial, the total volume of the mixture would be 800 ml + volume of water added. Let's call the volume of water added x.
Therefore, the total volume of the drink would be 800 ml + x.
We are asked to find the minimum capacity of the container in liters, so we need to convert the total volume of the drink from milliliters to liters:
800 ml + x = (800 + x)/1000 liters
Now we can set up an inequality to find the minimum value of x that would make the total volume of the drink at least 1 liter:
800 ml + x ≥ 1000 ml
Simplifying this inequality, we get:
x ≥ 200 ml
Therefore, the minimum volume of water that needs to be added to the cordial to make a drink with a total volume of at least 1 liter is 200 ml.
So the minimum capacity of the container would be:
800 ml + 200 ml = 1000 ml = 1 liter
Therefore, the minimum capacity of the container in liters would be 1 liter.
Step-by-step explanation:
Select all expressions equivalent to (2-³.24) 2.
4
04
26.2-8
02-5.22
None of the expressions given is equivalent to (2 - ³√24)²..
What do mathematics expressions mean?Mathematical statements must contain a sentence, at least one mathematical operation, and at least two numbers or factors. With this mathematical operation, you can increase, split, add, or take something away. The shape of a phrase is as follows: Expression: (Number/Variable, , Math Operator)
Let's first simplify the expression (2 - ³√24)²:
(2 - ³√24)² = (2 - 24^(1/3))² = (2 - 2.29)² = (-0.29)² = 0.0841
Now we can check which expressions are equivalent to 0.0841 when (2 - ³√24)² is evaluated:
4 = 4.0000... (not equivalent to 0.0841)
04 = 0.04 (not equivalent to 0.0841)
26.2 - 8 = 18.2 (not equivalent to 0.0841)
02 - 5.22 = -3.22 (not equivalent to 0.0841)
Therefore, none of the expressions given is equivalent to (2 - ³√24)².
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The captain of a ship at sea sights a lighthouse which is 160 feet tall.
The captain measures the angle of elevation to the top of the lighthouse to be 24.
How far is the ship from the base of the lighthouse?
The distance between the ship and the base of the is approximately 359.32 feet.
The distance between the ship and the base of the lighthouse can be found using the tangent of the angle of elevation.
The tangent of an angle in a right triangle is equal to the opposite side divided by the adjacent side. In this case, the opposite side is the height of the lighthouse (160 feet) and the adjacent side is the distance between the ship and the base of the lighthouse (x).
So, we can set up the equation:
tan(24) = 160/x
To solve for x, we can cross multiply and then divide:
x * tan(24) = 160
x = 160/tan(24)
Using a calculator, we can find that tan(24) is approximately 0.4452.
So, x = 160/0.4452
x = 359.32 feet
Therefore, the distance between the ship and the base of the lighthouse is approximately 359.32 feet.
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Andre and Elena knew that after 28 days they would have 228 coins, but they wanted to find out how many coins that actually is.
Andre wrote: 228= 2 x 28 = 56
Elena said, “No, exponents mean repeated multiplication. It should be 28 x 28, which works out to be 784.”
Who do you agree with? Could they both be correct or wrong? Explain your reasoning.
To find the number of coins the statement made by Elena is correct.
What are exponents?The exponent of a number indicates how many times a number has been multiplied by itself. For instance, 34 indicates that we have multiplied 3 four times. Its full form is 3 3 3 3. Exponent is another name for a number's power. It might be an integer, a fraction, a negative integer, or a decimal.
Elena is on point. The formula 228 = 28 x 2 = 56 doesn't make sense in this situation since it suggests that they only counted for 28 days and received 228 coins, when the problem states that they counted for 28 days and received 228 coins. The fact that they counted for 28 days and came up with a total of 28 times 28 coins, or 784, makes the equation 228 = 28 x 28 make sense. Elena is accurate as a result.
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1. Solve the system of equations using addition
and/or subtraction with multiplication method.
Select the best answer with the format (x, y).
6x + 4y = 12
-6x+6y=-72
O (6, -6)
O (13, 1)
O (3,5)
(12, 12)
no solution
infinite solutions
The value of (x,y) is ( 6, -6) (optionA)
What is Simultaneous equation?Simultaneous equations are two or more algebraic equations that share variables e.g. x and y . They are called simultaneous equations because the equations are solved at the same time. For example, below are some simultaneous equations: 2x + 4y = 14, 4x − 4y = 4. 6a + b = 18, 4a + b = 14.
6x+4y = 12 equation 1
-6x +6y = -72 equation 2
add equation 1 and 2
10y = - 60
y = -60/10
y = -6
substitute -6 for y in equation 1
6x +4(-6) = 12
6x -24 = 12
6x = 12+24
6x = 36
x = 36/6 = 6
therefore the value of (x,y) = ( 6, -6)
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confusion. help a pal out pls
The correct equation is;
p = 4t + 1
What is the equation of a line?The equation of a line is a mathematical expression that describes the relationship between the x and y coordinates of the points on the line. In general, the equation of a line can be written in slope-intercept form, which is y = mx + b, where m is the slope of the line and b is the y-intercept (the point at which the line crosses the y-axis).
We can get the slope of the graph from;
m = y2 - y1/x2 =x2 - x1
m = 1 - 0/0.25 - 0
m = 4
Since the y intercept is at y = 1 then we have;
p = 4t + 1
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19. The co-ordinates (α, ß) of a moving point are given by,
(iv)
α = 1/2a(t+1/t), β = 1/2a(t-1/t), where a is a constant;
in each case, obtain the relation between α and β, and hence write down the locus of the point as t varies.
Answer: To obtain the relation between α and β, we can eliminate t from the given equations.
(iv)
α = 1/2a(t+1/t)
β = 1/2a(t-1/t)
We can multiply these two equations to eliminate t^2:
αβ = (1/2a(t+1/t))(1/2a(t-1/t))
αβ = (1/4a^2)(t^2 - 1/t^2)
Multiplying both sides by 4a^2 gives:
4a^2αβ = t^2 - 1/t^2
Adding 1/t^2 to both sides gives:
4a^2αβ + 1/t^2 = t^2 + 1/t^2
Multiplying both sides by t^2 gives:
4a^2αβt^2 + 1 = t^4 + 1
Rearranging and simplifying gives the relation between α and β:
4a^2αβ = t^4 - 4a^2t^2 + 1
Now we can write the locus of the point as t varies:
4a^2αβ = t^4 - 4a^2t^2 + 1
This is a fourth degree equation in t, which represents a curve in the (α, β) plane. However, we can simplify it by noting that t^2 is always non-negative. Therefore, we can treat 4a^2t^2 as a constant and write:
4a^2αβ = (t^2 - 2a^2)^2 + 1 - 4a^4
This is the equation of a conic section called a hyperbola. Its center is at (0,0), its asymptotes are the lines α = ±β, and its foci are at (a√2,0) and (-a√2,0).
Step-by-step explanation:
1. Find the center of mass of the solid bounded by x = y 2 and the planes x = z, z = 0, and x = 1 if the density is rho(x, y, z) = k ∈ R is constant
2. The electric charge distributes over the disk x 2 + y 2 ≤ 1 such that the charge density at any point (x, y) is rho(x, y) = x + y + x 2 + y 2 (in coulombs per square meter). Find the total charge Q on the disk.
3. Find the center of mass of the triangular region with vertices (0, 0), (2, 0) and (0, 2) if the density is given by rho(x, y) = 1 + x + 2y
1) The center of mass of the solid bounded by x = y^2 and the planes x = z, z = 0, and x = 1 the center of mass of the solid is (1/3, 2/15, 1/3). 2) The total charge on the disk is 4/3 coulombs. 3) The center of mass of the triangular region is (2/3, 2/3).
Center of Mass = (∫xyzρdV)/(∫ρdV).
Here, V is the volume of the solid. Since the density is constant, we can pull it out of the integral:
Center of Mass = k*(∫xyzdV)/(∫dV).
We can now use the volume formula for the solid which is V = ∫xyzdxdyz. Plugging this in the above formula, we get:
Center of Mass = k*[(∫x∫ydxdyz)/(∫dxdyz)]
Evaluating the integrals, we get the x coordinate of the center of mass to be (1/3), the y coordinate to be (2/15) and the z coordinate to be (1/3). Thus, the center of mass of the solid is (1/3, 2/15, 1/3).
2. To find the total charge Q on the disk x^2 + y^2 ≤ 1 such that the charge density at any point (x, y) is rho(x, y) = x + y + x^2 + y^2 (in coulombs per square meter), we need to use the following formula:
Q = ∫∫rho(x, y)dxdy
Evaluating the integral, we get Q = (1/3) + (1/3) + (1/3) + (1/3) = 4/3. Thus, the total charge on the disk is 4/3 coulombs.
3. To find the center of mass of the triangular region with vertices (0, 0), (2, 0) and (0, 2) if the density is given by rho(x, y) = 1 + x + 2y, we need to use the following formula:
Center of Mass = (∫xyρdA)/(∫ρdA).
Here, A is the area of the triangle. Evaluating the integral, we get the x coordinate of the center of mass to be (2/3) and the y coordinate to be (2/3). Thus, the center of mass of the triangular region is (2/3, 2/3).
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Please do the foll calculation. When improper, rewrite number or integel 2.2+(3)/(5)
The final answer is 3
The calculation you are looking to solve is 2.2 + (3)/(5). To solve this, we first need to convert the improper number 2.2 to a fraction. We can do this by multiplying the whole number by the denominator of the fraction and then adding the numerator. In this case, we would multiply 2 by 5 and then add 2, giving us 12/5. Now, we can add this fraction to the other fraction:
12/5 + 3/5 = 15/5
Next, we can simplify the fraction by dividing both the numerator and denominator by the greatest common factor. In this case, the greatest common factor is 5, so we can divide both the numerator and denominator by 5:
15/5 = 3
Therefore, the final answer is 3.
In summary, 2.2 + (3)/(5) = 3.
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Assume 12% of a population of credit applications are fraudulent. (i.e each loan has a 12% probability of being fraudulent.)
Based on a random sample of 25 applications find the probability the number of fraudulent applications in the sample is
Equal to 0 [ Select ] Equal to 3 [ Select ] Equal to 3 or less [ Select ] Equal to 5 or more [ Select ] More than 3 [ Select ]
The probability of fraudulent applications are:
Equal to 0 [0.0410] Equal to 3 [0.2387] Equal to 3 or less [0.4088] Equal to 5 or more [0.1734] More than 3 [0.5912]How to determine the probability of fraudulent applicationsThe given parameters are
n = 25
p = 0.12
The individual probability can be calculated as
P(x) = C(n, x) * p^x * (1 - p)^(n - x)
So, we have
Probability the number of fraudulent applications in the sample is 0
P(0) = C(25, 0) * 0.12^0 * (1 - 0.12)^(25 - 0)
P(0) = 0.0410
Probability the number of fraudulent applications in the sample is 3
P(3) = C(25, 3) * 0.12^3 * (1 - 0.12)^(25 - 3)
P(3) = 0.2387
Probability the number of fraudulent applications in the sample is 3 or less
P(x ≤ 3) = P(0) + ... P(3)
Using the formula above, we have
P(x ≤ 3) = 0.4088
Probability the number of fraudulent applications in the sample is 5 or more
P(x ≥ 5) = P(5) + ... P(25)
Using the formula above, we have
P(x ≥ 5) = 0.1734
Probability the number of fraudulent applications in the sample is more than 3
P(x > 3) = 1 - P(x ≤ 3)
By substitution, we have
P(x > 3) = 1 - 0.4088
P(x > 3) = 0.5912
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the volume of a cylinder is 1078 cm3 and it's height 7cm find the radius of the base
Answer:
r=7
Step-by-step explanation:
Cylinder Area
= πr² x h
1078 = 22/7 x r² x 7
1078/22 = r²
49=r²
r=7
PLEASE HELPPP!!
and thank you in advance!!!
The requried value of the expression [tex]\sum_{n=11}^{30}n-\sum_{n=1}^{10}n[/tex] is 355.
What is simplification?Simplification involves applying rules of arithmetic and algebra to remove unnecessary terms, factors, or operations from an expression.
Here,
To evaluate the expression:
[tex]\sum_{n=11}^{30}n-\sum_{n=1}^{10}n[/tex]
we can first simplify each summation separately and then subtract the second summation from the first.
[tex]\sum_{n=11}^{30}n[/tex]= 11 + 12 + 13 + ... + 29 + 30
We can use the formula for the sum of an arithmetic series to simplify this expression:
S = (n/2)(a + l)
In this case, a = 11, l = 30, and n = 20 (since we're summing 20 terms).
So, we have:
S = (20/2)(11 + 30)
S= 410
Similarly,
[tex]\sum_{n=1}^{10}n[/tex] = 1 + 2 + 3 + ... + 9 + 10
S = 55
Finally, we can subtract the second summation from the first:
= 410 - 55 = 355
Therefore, the value of the expression is 355.
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Question 1 (1 point ) Find the quotient and remainder using (12x^(3)+15x^(2)+21x)/(3x^(2)+4)
The quotient is 4x+5 and the remainder is -15x.
The quotient and remainder when dividing (12x^(3)+15x^(2)+21x)/(3x^(2)+4) can be found using polynomial long division.
First, divide the leading term of the numerator by the leading term of the denominator: (12x^(3))/(3x^(2)) = 4x. This is the first term of the quotient.
Next, multiply the first term of the quotient by the denominator and subtract the result from the numerator: (12x^(3)+15x^(2)+21x) - (4x)(3x^(2)+4) = 15x^(2)+5x.
Now, repeat the process with the new numerator: (15x^(2))/(3x^(2)) = 5. This is the second term of the quotient.
Again, multiply the second term of the quotient by the denominator and subtract the result from the new numerator: (15x^(2)+5x) - (5)(3x^(2)+4) = -15x.
Since the degree of the new numerator is less than the degree of the denominator, the division is complete and the new numerator is the remainder.
Therefore, the quotient is 4x+5 and the remainder is -15x.
In conclusion, the quotient and remainder when dividing (12x^(3)+15x^(2)+21x)/(3x^(2)+4) are 4x+5 and -15x, respectively.
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A researcher found that for the years 2013 to 2019, the equation,
y=-0.4(x-3)2 +42) models the average gas mileage of new vehicles sold in
Switzerland, where is the number of years since 2013 and is the average gas
mileage, in miles per gallon (mpg).
During what year was the average gas mileage for new vehicles sold in Switzerland
the greatest?
Using equation of parabola in vertex form the year in which the average gas mileage for new vehicles sold in Switzerland the greatest is 2016.
What is the equation of a parabola in vertex form?The equation of a parabola with vertex (h, k) is given by
y = a(x - h)² + k
Now a researcher found that for the years 2013 to 2019, the equation, y = -0.4(x - 3)² + 42 models the average gas mileage of new vehicles sold in Switzerland, where is the number of years since 2013 and is the average gas mileage, in miles per gallon (mpg).
To determine during what year was the average gas mileage for new vehicles sold in Switzerland the greatest, we notice that the equation is the equation of a parabola in vertex form where (h, k) is the vertex.
Comparing y = a(x - h)² + k with y = -0.4(x - 3)² + 42 we have that
a = -0.4, h = 3 and k = 42
So, the vertex is at (h, k) = (3, 42)
Since a = -0.4 < 0, (3,42) is a maximum point
So, y is maximum when x = 3
Since this is 3 years after 2013 which is 2013 + 3 = 2016.
So, the year in which the average gas mileage for new vehicles sold in Switzerland the greatest is 2016.
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Need to know what matches with what and showing how you got the answer. Thanks.
Answer:
1-B
2-E
3-D
4-A
5-C
Step-by-step explanation:
-4x + 3y = 3
3y = 4y + 3
y = 4/3 y + 1 => slope is 4/3, y-intercept is (0,1)
Equation 1 matches with Letter B
12x - 4y = 8
4y = 12x - 8
y = 3x - 2 => slope is 3, y-intercept is (0,-2)
Equation 2 matches with Letter E
8x + 2y = 16
2y = -8x + 16
y = -4x + 8 => slope is -4, y-intercept is (0,8)
Equation 3 matches with Letter D
-x + 1/3 y = 1/3
1/3 y = x + 1/3
y = 3x + 1 => slope is 3, y-intercept is (0,1)
Equation 4 matches with Letter A
-4x + 3y = -6
3y = 4x = -6
y = 4/3 x - 2 => slope is 4/3, y-intercept is (0,-2)
Equation 5 matches with Letter C
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need help finding side length. asap pls
The missing side in the triangle has a length of 9.899.
What is the property of an isosceles triangle?In an isosceles triangle, the two sides are equal and the angles opposite to the two equal sides are also equal.
In the figure, ∠RQS = ∠RSQ =45°
Thus, it is an isosceles triangle with sides RQ=RS= 7
What is Pythagoras' theorem?
According to Pythagoras' theorem for a right-angled triangle:
Base² + Height²= Hypotensuse²
In the given figure: Base = 7 and Height = 7,
Thus, QS²= RQ² + RS²
QS² = 7² + 7²
QS = √98
=9.899
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I need help from a baddie
Answer:
on what?
Step-by-step explanation:
How do you get rid of an inner bully?
5 Ways to Stop that Inner Bully
Become aware of what you are saying to yourself. ...
Replace this with mindful attention to your feelings. ...
Realize you are not alone in your suffering. ...
Use soothing self-talk. ...
Access Your Wise Mind.
Use the table of random numbers to simulate the situation.
An amateur golfer hits the ball 48% of the time he attempts. Estimate the probability that he will hit at least 6 times in his next 10 attempts.
The estimate of the probability that he will hit at least 6 times in his next 10 attempts is given as follows:
80%.
How to calculate a probability?A probability is calculated as the division of the desired number of outcomes by the total number of outcomes in the context of a problem/experiment.
An amateur golfer hits the ball 48% of the time he attempts, hence we round the probability to 50%, and have that the numbers are given as follows:
1 to 5 -> hits.6 to 10 -> does not hit.From the table, we have 20 sets of 10 attempts, and in 16 of them he hit at least 6 attempts, hence the probability is given as follows:
16/20 = 0.8 = 80%.
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Which measurements could represent the side lengths in feet of a right triangle?
14 ft, 14 ft, 14 ft
10 ft, 24 ft, 26 ft
3 ft, 3 ft, 18 ft
2 ft, 3 ft, 5 ft
Option 4: 2 feet, 3 feet, and 5 feet – constitutes a right angle since 2² + 3² = 4 + 9 = 13 and 13 = 5², making it.
What is a Class 7 triangle?A triangle is a geometry with three vertices and three sides. The internal angle of the triangle, which really is 180 degrees, is built. The inner triangle angles are implied to sum to 180 degrees. It has the fewest sides of any polygon.
The Pythagorean theorem states that the square of a hypotenuse's length (the side exact reverse the right angle) in a right triangle is the product of a squares of the durations of the remaining two sides. Only the last option—2 feet, 3 feet, and 5 feet—can represent the second derivative of a right triangle because it satisfies this requirement.
Let's check each option:
Option 1: 14 feet, 14 feet, 14 feet - As all three are equal, this doesn't qualify as a right triangle and the Pythagoras theorem cannot be met.
Option 2: 10 feet, 24 feet, and 26 feet - Because 10² + 24² = 100 + 576 = 676, which is equivalent to 26², this is a right triangle. The fact that this option is a multiple of the well-known Polynomial triple (3, 4, and 5) implies that we can scale all of the corresponding sides by a common factor to produce an infinite number of right triangles with all these side lengths. As a result, this option doesn't really represent an original right triangle.
Option 3: 3 ft, 3 ft, 18 ft - This does not constitute a right triangle because the cube of the hypotenuse's length (18² = 324) does not equal the total of the squares of a shorter side (3² + 3² = 18).
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Answer:
2 feet, 3 feet, and 5 feet
Step-by-step explanation:
got it right on my test
The net of a square pyramid is shown below: Net of a square pyramid showing 4 triangles and the square base. The square base has side lengths of 2 inches. The height of each triangle attached to the square is 3 inches. The base of the triangle is the side of the square. What is the surface area of the solid? (5 points) 16 square inches 24 square inches 28 square inches 32 square inches
4(3)(2)/2 + 2² = 12 + 4 = 16
Find a sinusoidal function with the following four attributes:
(1) amplitude is 25, (2) period is 15, (3) midline is y=38, and (4)
f(1)=63.
The required sinusoidal function be,
⇒ y = 25 sin(2π/15 (x - 1 + 15/4 + 30nπ)) + 38
or
⇒ y = 25 sin(2π/15 (x - 1 - 15/4 - 30nπ)) + 38
Since we know that,
The general formula of a sinusoidal function is,
⇒ y = A sin(B(x - C)) + D,
where,
A is the amplitude
B is the frequency (and related to the period by T = 2π/B)
C is the phase shift (the horizontal displacement from the origin)
D is the vertical shift (the midline)
Using the given information,
Amplitude = 25, so A = 25.
Period = 15, so T = 15.
We know that,
T = 2π/B, so we can solve for B,
⇒ 15 = 2π/B
⇒ B = 2π/15
Midline is y = 38, so D = 38.
⇒ f(1) = 63,
so we can also use this to find the phase shift:
⇒ 63 = 25 sin(B(1-C)) + 38
⇒ 25 sin(B(1-C)) = 25
⇒ sin(B(1-C)) = 1
⇒ B(1-C) = π/2 + 2nπ or 3π/2 + 2nπ,
where n is an integer.
Substituting B and solving for C in each case, we get,
⇒ B(1-C) = π/2 + 2nπ 2π/15 (1 - C)
= π/2 + 2nπ 1 - C
= 15/4 + 30nπ C
= 1 - 15/4 - 30nπ
⇒ B(1-C) = 3π/2 + 2nπ 2π/15 (1 - C)
= 3π/2 + 2nπ 1 - C
= 15/4 + 60nπ/2 C
= 1 - 15/4 - 30nπ
So we have two possible functions are,
⇒ y = 25 sin(2π/15 (x - 1 + 15/4 + 30nπ)) + 38
or
⇒ y = 25 sin(2π/15 (x - 1 - 15/4 - 30nπ)) + 38
where n is any integer.
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math help someone pls answer 7thgrade math question
Answer:
128
Step-by-step explanation:
Answer: 128
Step-by-step explanation:
Remember the order of operations in this problem:
8² x (2 + 6) / 4
8² x (8) / 4
64 X 8 /4
512 / 4
= 128
Hope this helps!
Jeremiah and his brother are having a competition to see how many vegetables they can eat in a week. Jeremiah’s mom is rewarding the brothers for their efforts: at the end of the week, she’s going to give them an amount of prize money that is 4 times the sum of the number of vegetables they each eat. By the end of the week, Jeremiah had eaten 15 servings of vegetables. His mom paid him and his brother $100 Who ate more vegetables, Jeremiah or his brother? By how many?
Answer:
Jeremiah ate more, by 5 servings more
Step-by-step explanation:
$100 is 4 x number of vegetable servings
100/4 = 25 number of total servings
If Jeremiah ate 15 servings, his brother ate 25-15 =10
Servings Jeremiah 15, brother 10
After your collection, you obtain an average disc width of 18.76cm with a sample size of 56.
1) Enter in the appropriate null mean.
2)According to your null distribution, what is the probability of obtaining your sample estimate or more extreme? what is the p-value?
a)18
b)0.023
1) The null mean for the disc width is assumed to be 18.
2) According to your null distribution, the probability of obtaining a sample estimate of 18.76 cm or more extreme is 0.023, and the p-value is 0.023.
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would appreciate fast answer :)
a. angle 2 and angle 1, angle 2 and angle 3 are linear pairs. b. angle 9 and angle 8, angle 9 and angle 5 are linear pairs. c. angle 4 and angle 2 form vertical angles.
What are linear pairs?A linear pair of angles in geometry is a pair of neighbouring angles created by the intersection of two lines. When two angles share a vertex and an arm but do not overlap, they are said to be adjacent angles. Due to their formation on a straight line, the linear pair of angles are always complementary. Thus, the total of two angles in a pair of lines is always 180 degrees.
a. angle 2 and angle 1, angle 2 and angle 3 are linear pairs.
b. angle 9 and angle 8, angle 9 and angle 5 are linear pairs.
c. angle 4 and angle 2 form vertical angles.
d. angle 8 and angle 5 form vertical angles.
e. The rays that form angle 7 and angle 9 do not for, opposite rays.
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Determine if the relation defines y as a function of x. y 4+ 3+ 3 2 . 1 2 1+ 2+ -3+ 4+ Yes, this relation defines y as a function of x. Х 5 No, this relation does not define y as a function of x.
No, this relation does not define y as a function of x.
A function is a relation in which each input (x-value) is paired with exactly one output (y-value). In this relation, the x-value of 2 is paired with two different y-values (3 and -3), which violates the definition of a function.
Therefore, this relation does not define y as a function of x.
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1/6 times a number is the same as 8.
Answer:
48
Step-by-step explanation:
We know
1/6 times a number is the same as 8. Let's x be the unknown number we have the equation
1/6x = 8
8 divided by 1/6
8 ÷ 1/6 = 8 × 6 = 48
So, the answer is 48
Solve the compound linear inequality gr to the nearest tenth whenever appropria 1.4<=9.2-0.8x<=6.9
The solution to the compound linear inequality 1.4 ≤ 9.2 - 0.8x ≤ 6.9 are the values of x in the interval [2.9, 9.8].
To solve the compound linear inequality, we need to isolate the variable on one side of the inequality. We can do this by following the same steps as we would when solving a regular equation, but remembering to flip the inequality sign if we multiply or divide by a negative number.
1.4 ≤ 9.2 - 0.8x ≤ 6.9
First, we'll subtract 9.2 from all sides of the inequality:
-7.8 ≤ -0.8x ≤ -2.3
Next, we'll divide all sides by -0.8 to isolate the variable. Remember to flip the inequality signs since we're dividing by a negative number:
9.75 ≥ x ≥ 2.875
Finally, we'll write the solution to the nearest tenth in interval notation:
[2.9, 9.8]
So, the solution to the compound linear inequality are all values of x, which is greater than or equal to 2.9 but less than or equal to 9.8, or x is in the interval [2.9, 9.8].
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FIND THE GREATEST COMON FACTOR AND THE LEAST COMON MULTIPLE FOR 12,18,24
Answer: LCM is 72. GCF is 6.
a. Simplify the polynomial expressions and write in standard form. b. Classify by degree and number of terms. 1. \( a^{3}\left(a^{2}+a+1\right) \) 2. \( \left(3 x^{2}-4 x+3\right)-(4 x-10) \) a. i b.
polynomial expression of degree 2 with 3 terms.
a. i. \( a^{3}\left(a^{2}+a+1\right) = a^{5}+a^{4}+a^{3} \)
ii. \( \left(3 x^{2}-4 x+3\right)-(4 x-10) = 3 x^{2}-7 x-7 \)
b. i. \( a^{5}+a^{4}+a^{3} \) is a polynomial expression of degree 5 with 3 terms.
ii. \( 3 x^{2}-7 x-7 \) is a polynomial expression of degree 2 with 3 terms.
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