=================================================
Explanation:
2 freshmen + 3 sophomores + 2 juniors + 2 seniors = 9 students total.
Let's consider the cases where we have the same number of juniors and seniors. We'll then take the complement of this to get the final answer.
Case A will look at having 1 of each junior and senior.Case B will look at having 2 each of juniors and seniors.-----------
Case A: There is 1 junior and 1 senior
There are 2 ways to pick a junior and 2 ways to pick a senior. That's 2*2 = 4 ways so far.
Then we have 9-4 = 5 students left to pick from (i.e. 2 freshmen+3 sophomores = 5 students left) and we have 5-2 = 3 seats to fill. Order doesn't matter on the committee since each person has equal rank.
We use the nCr combination formula.
n = 5 students
r = 3 seats to fill
n C r = (n!)/(r!(n-r)!)
5 C 3 = (5!)/(3!*(5-3)!)
5 C 3 = (5!)/(3!*2!)
5 C 3 = (5*4*3!)/(3!*2!)
5 C 3 = (5*4)/(2!)
5 C 3 = (5*4)/(2*1)
5 C 3 = (20)/(2)
5 C 3 = 10
There are 10 ways to fill the remaining 3 seats when we pick from the freshmen and sophomores only.
To recap everything so far:
4 ways to pick the 1 junior and 1 senior10 ways to pick the 3 other students (freshmen + sophomores)Therefore, we have 4*10 = 40 different combinations possible for case A. We'll refer to this value later.
-----------
Case B: We pick 2 juniors and 2 seniors
Since there 2 juniors to pick from, and 2 junior seats to fill, there's only 1 way to do this. Likewise, there's only 1 way to pick the 2 seniors to fill the 2 seats.
In total so far there is 1*1 = 1 way to pick the 2 juniors and 2 seniors in any order you like.
Then we have 9-4 = 5 students left that are freshmen or sophomores. This is the number of choices we have for the final 5th seat.
We have 1*5 = 5 ways to have case B happen.
----------
Summary so far:
40 ways to do case A5 ways to do case B40+5 = 45 ways to do either case.There are 45 ways to have the same number of juniors as seniors (either 1 of each or 2 of each).
Now we must calculate the number of total combinations possible on this committee. We'll turn to the nCr formula again.
n = 9 students
r = 5 seats
n C r = (n!)/(r!(n-r)!)
9 C 5 = (9!)/(5!*(9-5)!)
9 C 5 = (9!)/(5!*4!)
9 C 5 = (9*8*7*6*5!)/(5!*4!)
9 C 5 = (9*8*7*6)/(4!)
9 C 5 = (9*8*7*6)/(4*3*2*1)
9 C 5 = (3024)/(24)
9 C 5 = 126
There are 126 different five-person committees possible.
Of those 126 committees, 45 of them consist of cases where we have the same number of juniors and seniors.
That must mean there are 126-45 = 81 combinations where we do not have the same number of juniors and seniors. This is where the concept of "complement" comes in.
Reasoning: If one quadratic equation has a positive discriminant, and another quadratic equation has a discriminant equal to 0, can the two quadratic equations share a solution? Explain why or why not. If so, give two quadratic equations that meet this criterion. HELP ASAP PLS (55 points)
Two quadratic equations can share a solution if one quadratic equation has a positive discriminant and another quadratic equation has a discriminant equal to 0
What is meant by quadratic equation?
A quadratic equation is a polynomial equation of degree 2, which means it involves an unknown variable (usually denoted as x) that is raised to the power of 2.
If one quadratic equation has a positive discriminant, it means that the quadratic equation has two distinct real roots. On the other hand, if another quadratic equation has a discriminant equal to 0, it means that the quadratic equation has only one real root that is repeated.
Therefore, it is possible for two quadratic equations to share a solution if one quadratic equation has a positive discriminant and another quadratic equation has a discriminant equal to 0, but only if the repeated root of the second quadratic equation is one of the two roots of the first quadratic equation.
To illustrate this, let's consider the following two quadratic equations:
Quadratic equation 1: [tex]$x^2 - 4x + 3 = 0$[/tex]
Quadratic equation 2: [tex]$x^2 - 2x + 1 = 0$[/tex]
The discriminant of quadratic equation 1 is [tex]$b^2-4ac = 4 - 4(1)(3) = -8$[/tex], which is negative. Therefore, quadratic equation 1 has two distinct real roots, which can be found using the quadratic formula:
[tex]$x=\frac{-b\pm\sqrt{b^2-4ac}}{2a}$[/tex]
Substituting the values of a, b, and c from quadratic equation 1, we get:
[tex]$x=\frac{4\pm\sqrt{(-4)^2-4(1)(3)}}{2(1)}$[/tex]
[tex]$x=2\pm\sqrt{1}$[/tex]
[tex]x=3$ or $x=1$[/tex]
Therefore, the roots of quadratic equation 1 are [tex]x=3$ and $x=1$[/tex].
The discriminant of quadratic equation 2 is [tex]$b^2-4ac = 2^2 - 4(1)(1) = 0$[/tex]. Therefore, quadratic equation 2 has one repeated real root, which is:
[tex]$x=\frac{-b\pm\sqrt{b^2-4ac}}{2a}$[/tex]
Substituting the values of a, b, and c from quadratic equation 2, we get:
[tex]$x=\frac{2\pm\sqrt{2^2-4(1)(1)}}{2(1)}$[/tex]
[tex]$x=1$[/tex] (repeated root)
As we can see, the repeated root of quadratic equation 2 is equal to one of the roots of quadratic equation 1, which is [tex]$x=1$[/tex]. Therefore, these two quadratic equations share a solution.
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List down three (3) equations that can be seen in the graph for each type of function and identify their
domain and range.
constant funtion
Function,Domain,Range=
linear function
function,domain,range=
quadratic function
function,domain,range=
The equations of the functions are x = -10, y = x + 5 and y = x² + 6x + 10, and the identities are shown below
Calculating the functions and their identitiesConstant function
This function remains constant regardless of the input and/or output.
The graph shows a vertical line located at x = -10.
The function represented by this graph is constant, with a domain of x = -10 and a range of y [0, 12.25]
Linear function
The function varies continuously in relation to both x and y.
We can observe two points on the graph, which are (-4, 1) and (-2, 3).
From the point, we can see that y is more than x by 5
This means that the function is y = x + 5
The following identities of the functions are Domain: [-4, -2] and Range: [1, 3]
Quadratic function
This function can be represented as
y = a(x - h)² + k
From the graph, we have
(h, k) = (-3, 1) and (x, y) = (-2, 2)
By substitution, we have
y = a(x + 3)² + 1
By substitution, we have
2 = a(-2 + 3)² + 1
Solving for a, we have
a = 1
So, we have
y = (x + 3)² + 1
y = x² + 6x + 10
This means that the function is y = x² + 6x + 10 with the following identities
Domain: [-4, -2]
Range: [1. 2]
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determine two functions, defined on the interval , whose wronskian is given by . are the functions that you found linearly independent on ? how do you know?
Two functions that satisfy the given condition and are linearly independent on (-∞,∞) are f1(x) = e^(x) and f2(x) = e^(x)
Let's start by recalling the definition of the Wronskian for two functions f1(x) and f2(x):
W(f1,f2)(x) = f1(x)f2'(x) - f1'(x)f2(x)
Given the Wronskian W(f1,f2)(x) = e^(2x), we can try to find functions f1(x) and f2(x) that satisfy this condition. One possible solution is:
f1(x) = e^(x)
f2(x) = e^(x + C)
where C is a constant. We can now calculate the Wronskian of f1(x) and f2(x):
W(f1,f2)(x) = f1(x)f2'(x) - f1'(x)f2(x)
= e^(x) [e^(x + C)]' - [e^(x)]' e^(x + C)
= e^(x) e^(x + C) - e^(x) e^(x + C)
= 0
This means that f1(x) and f2(x) are linearly dependent. However, we can modify our choice of f2(x) by setting C= -x, which gives:
f2(x) = e^(2x - x) = e^(x)
Now we can calculate the Wronskian again:
W(f1,f2)(x) = f1(x)f2'(x) - f1'(x)f2(x)
= e^(x) [e^(x)]' - [e^(x)]' e^(x)
= e^(2x)
Since the Wronskian is non-zero, this means that f1(x) and f2(x) are linearly independent on (-∞,∞).
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The given question is incomplete, the complete question is:
Determine two functions, defined on the interval (−∞,∞), whose Wronskian is given by W(f 1 ,f 2)=e ^2x. Are the functions that you found linearly independent on (−∞,∞)
a sample of 179 students using method 1 produces a testing average of 55.9 . a sample of 176 students using method 2 produces a testing average of 89.8 . assume the standard deviation is known to be 8.92 for method 1 and 16 for method 2. determine the 95% confidence
The 95% confidence interval for the true difference between testing averages for students using Method 1 and students using Method 2 is -36.54 to -31.26.
To calculate the 95% confidence interval for the true difference between the testing averages of the two instructional methods, we can use the following formula
Confidence interval = (X1 - X2) ± Z*(σ1^2/n1 + σ2^2/n2)^0.5
Where
X1 is the testing average for Method 1
X2 is the testing average for Method 2
Z is the critical value for a 95% confidence interval, which is 1.96
σ1 is the known standard deviation for Method 1
σ2 is the known standard deviation for Method 2
n1 is the sample size for Method 1
n2 is the sample size for Method 2
Substituting the values given in the problem, we get
Confidence interval = (55.9 - 89.8) ± 1.96*(8.92^2/179 + 16^2/176)^0.5
= -33.9 ± 2.64
Therefore, the 95% confidence interval using Method 1 and students using Method 2 is -36.54 to -31.26.
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The given question is incomplete, the complete question is:
A researcher compares the effectiveness of two different instructional methods for teaching anatomy. A sample of 179 students using Method 1 produces a testing average of 55.9. A sample of 176 students using Method 2 produces a testing average of 89.8. Assume the standard deviation is known to be 8.92 for Method 1 and 16 for Method 2. Determine the 95% confidence interval for the true difference between testing averages for students using Method 1 and students using Method 2
please answer this questain with explanation
Answer:
It cannot be in the sequence because counting back in 0.4 will give you even numbers and not odd hence 1.5 cannnot be in the sequence.
PLEASE MARK IT THE BRAINLIEST!!!
Complete the statements. Keith's strategy for finding the product is select and the product of 21. 5 and 5. 3 is select
When multiplying 31. 5 by 5. 3, Keith found the product using the following steps. (31 + 6. 5)(5 + 6. 3) = (35 * 5) + (5. 5 * 5. 3) = 155 + 5. 15
Keith found that the product of 31.5 and 5.3 is 160.15
Keith's strategy for finding the product is breaking the numbers into parts and then adding the results.
The product of 21.5 and 5.3 is
(20 + 1 + 0.5) × (5 + 0.3) = (20 × 5) + (20 × 0.3) + (1 × 5) + (1 × 0.3) + (0.5 × 5) + (0.5 × 0.3) = 100 + 6 + 5 + 0.3 + 2.5 + 0.15 = 114.95
When multiplying 31.5 by 5.3, Keith used a similar approach, breaking the numbers into parts and then adding the results. Specifically, he expanded the terms as (31 + 0.5)(5 + 0.3), added the partial products, and then rounded the result to two decimal places.
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1 point
Find the value of x:
10
15
Type your answer...
13
The value of x, considering the similar triangles, is given as follows:
x = 26.
What are similar triangles?Similar triangles are triangles that share these two features listed as follows:
Congruent angle measures, as both triangles have the same angle measures.Proportional side lengths, which helps us find the missing side lengths.The two triangles in this problem are similar, due to the bisection, hence the equivalent side lengths are given as follows:
10 and 15 - 10 = 5.x and 13.Then the proportional relationship is given as follows:
x/13 = 10/5.
Meaning that the value of x is given as follows:
x/13 = 2
x = 26.
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Draw a number line, and create a scale for the number line. In order to plot the points
1) The line number and the plot of the numbers are shown in the graph that is attached.
2) The opposite of an integer is offset by the same amount from zero.
Explain how you found the opposite of each point.The three numerals on the number line and their corresponding opposites are shown in the pictures that are attached.
We must determine the number of places on the scale starting at zero to determine a number's opposite. The same amount of places is then counted starting from zero in the opposite direction.
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Complete question:
Draw a number line, and create a scale for the number line to plot the points −2, 4, and 6.
a. Graph each point and its opposite on the number line.
b. Explain how you found the opposite of each point.
I need help with my geometry homework. (The image is attached below.)
4. CE is a median of triangle ADF, BF is the midpoint of AC.
5. CE = 3√3 cm and AG = 18√3 cm
6. AM is a median of right triangle ABC.
Describe Triangle?In mathematics, a triangle is a geometric shape that consists of three line segments that intersect at three endpoints. These endpoints are called vertices, and the line segments are called sides.
Triangles are one of the most basic shapes in geometry and are used in many areas of mathematics, science, engineering, and everyday life. They can be classified based on the length of their sides and the measure of their angles.
4. CE is a median of triangle ADF.
BF is the midpoint of AC.
Since C is the midpoint of segment AD and E is the midpoint of segment FD, CE is a median of triangle ADF. This is because CE passes through D and divides the opposite side A F into two equal halves.
Similarly, since B is the midpoint of segment AC, BF is a midpoint of AC. This is because BF passes through A and divides the opposite side AC into two equal halves.
5. To find CE and AG, we can use the fact that BF = 24 cm. Let's start by finding CE.
Since BF is the midpoint of AC, we have:
AC = 2 BF = 2(24 cm) = 48 cm.
Since C is the midpoint of AD, we have:
AD = 2 CD = 2 CE (by definition of midpoint)
Therefore, CE = AD/2
To find AD, we can use the fact that E is the midpoint of FD, so:
FD = 2 FE = 2 FG (by definition of midpoint)
Since F is the midpoint of GE, we have:
GE = 2 GF (by definition of midpoint)
Therefore, AG = AE + GE = AE + 2GF
Now, since AM is a median of triangle ABC, we have:
AM² = (AB² + BC²)/2 - (AC²/4)
Since triangle ABC is a right-angled triangle with angle B = 90 degrees, we have:
AB² + BC² = AC²
Therefore, we can simplify the equation for AM² as follows:
AM² = AC²/2 - AC²/4
AM² = AC²/4
Substituting the value we found for AC, we get:
AM² = 48²/4 = 576
Therefore, AM = 24 cm.
Now, we can use the Pythagorean theorem to find AE:
AE² + EM² = AM²
AE² + (AC/2)² = AM²
AE² + 24² = 576
AE² = 576 - 576/4 = 432
AE = √432 = 12√3 cm
Finally, we can find AG as:
AG = AE + 2GF = AE + 2(AD/4) (since G is the midpoint of EF)
AG = 12√3 + AD/2
But we know that AD = 2CE, so:
AG = 12√3 + CE
Therefore, to find AG, we just need to add the value of CE that we found earlier:
AG = 12√3 + CE = 12√3 + (AD/2) = 12√3 + (CE/2) = 12√3 + 6√3 = 18√3 cm.
Therefore, CE = AD/2 = (AG - 12√3)/2 = (18√3 - 12√3)/2 = 3√3 cm.
So, CE = 3√3 cm and AG = 18√3 cm.
6. Statement: AM is a median of right triangle ABC.
A median of a triangle is a line segment that joins a vertex to the midpoint of the opposite side. In right triangle ABC, the median AM joins the right angle vertex A to the midpoint of the hypotenuse BC.
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4). Section AC's midpoint is B, and section BF's midpoint is BF. Because BF cuts through A and splits the opposing side AC into two equal halves, this is the case.
5). CE = AD/2 = (AG - 12√3)/2 = (18√3 - 12√3)/2 = 3√3 cm.
So, CE = 3√3 cm and AG = 18√3 cm.
6). The middle of the hypotenuse BC is connected to the right angle vertex A by the median AM.
Describe Triangle?One of the most fundamental geometric shapes, triangles are used frequently in mathematics, science, engineering, and daily living. They can be categorized based on the dimensions of their edges and sides.
4). ADF's triangle's middle is CE.
BF sits in the middle of AC.
Triangle ADF's median is CE because C is the midway of segment AD and E is the midpoint of segment FD. This is the case because CE passes through D and divides the opposite side A F into two equal halves.
BF functions as an AC midpoint in a manner similar to how B acts as the segment's halfway point. This is the case because BF cuts through A and divides the opposite side AC into two equal halves.
5). We can use the knowledge that BF = 24 centimeters to determine CE and AG. Let's begin by locating CE.
Because BF is AC's middle, we have:
AC = 2 BF = 2(24 cm) = 48 cm.
Since C is the midpoint of AD, we have:
AD = 2 CD = 2 CE (by definition of midpoint)
Therefore, CE = AD/2
To find AD, we can use the fact that E is the midpoint of FD, so:
FD = 2 FE = 2 FG (by definition of midpoint)
Since F is the midpoint of GE, we have:
GE = 2 GF (by definition of midpoint)
Therefore, AG = AE + GE = AE + 2GF
Now that triangle ABC's middle is AM, we have:
AM² = (AB² + BC²)/2 - (AC²/4)
Triangle ABC has a right angle of 90 degrees, so we have:
AB² + BC² = AC²
As a result, we can simplify the AM² equation as follows:
AM² = AC²/2 - AC²/4
AM² = AC²/4
When we substitute the AC number we discovered, we obtain:
AM² = 48²/4 = 576
Therefore, AM = 24 cm.
We can now determine AE using the Pythagorean theorem:
AE² + EM² = AM²
AE² + (AC/2)² = AM²
AE² + 24² = 576
AE² = 576 - 576/4 = 432
AE = √432 = 12√3 cm
Finally, we can find AG as:
AG = AE + 2GF = AE + 2(AD/4) (since G is the midpoint of EF)
AG = 12√3 + AD/2
But we know that AD = 2CE, so:
AG = 12√3 + CE
The value of CE that we previously discovered can therefore simply be added to obtain AG:
AG = 12√3 + CE = 12√3 + (AD/2) = 12√3 + (CE/2) = 12√3 + 6√3 = 18√3 cm.
Therefore, CE = AD/2 = (AG - 12√3)/2 = (18√3 - 12√3)/2 = 3√3 cm.
So, CE = 3√3 cm and AG = 18√3 cm.
6). AM is the middle of the right triangle ABC.
A line section connecting a triangle's vertex to the middle of the other side is the triangle's median. The median AM connects the right angle vertex A to the middle of the hypotenuse BC in the right triangle ABC.
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The volume of a right cone is 33\piπ units^3
3
. If its circumference measures 6\piπ units, find its height.
Let's denote the radius of the cone as 'r' and the height as 'h'.
The formula for the volume of a cone is:
V = (1/3) * π * r^2 * h
And the formula for the circumference of the base of a cone is:
C = 2 * π * r
We know that the volume of the cone is 33π/3, so:
(1/3) * π * r^2 * h = 33π/3
Simplifying this equation, we get:
π * r^2 * h = 99π
r^2 * h = 99
We also know that the circumference of the base of the cone is 6π, so:
2 * π * r = 6π
Simplifying this equation, we get:
r = 3
Now we can substitute this value of 'r' into the equation we obtained earlier:
r^2 * h = 99
3^2 * h = 99
h = 11
Therefore, the height of the cone is 11 units.
A glider begins its flight 4/5 mile above the ground. After 30 minutes, it is 3/10 mile above the ground. Find the change in heigh of the glider. If it continues to descend at this rate, how long does the entire descent last?
Answer:1 hour 15 Minutes
Step-by-step explanation:The glider begins its flight mile above the ground.
Distance above the ground after 45 minutes =
Change in height of the glider
Next, we determine how long the entire descent last.
Expressing the distance moved as a ratio of time taken
Therefore: Total Time taken =45+30=75 Minutes
=1 hour 15 Minutes
what is the probability of being delt 4 hearts from a standard 52 card deck if only 4 cards are to be delt
The probability of being dealt 4 hearts from a standard 52 card deck if only 4 cards are to be dealt is 0.0026.
There are 52 cards in a standard deck, 13 of which are hearts.
We want to find the probability of getting dealt four hearts out of a four-card hand.
Since order doesn't matter, we will use combinations to calculate this probability.
P(A) = number of favorable outcomes / total number of possible outcomes.
There are 13 choose 4 ways to choose four hearts from the deck, and there are 52 choose 4 ways to choose any four cards from the deck.
So the probability of being dealt four hearts from a standard 52 card deck if only 4 cards are to be dealt is:
P(A) = (13 choose 4) / (52 choose 4)P(A)
= (715) / (270725)P(A)
= 0.002641056.
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you are a researcher studying the lifespan of a certain species of bacteria. a preliminary sample of 35 bacteria reveals a sample mean of hours with a standard deviation of hours. you would like to estimate the mean lifespan for this species of bacteria to within a margin of error of 0.75 hours at a 95% level of confidence.what sample size should you gather to achieve a 0.75 hour margin of error? round your answer up to the nearest whole number.
A sample of 312 bacteria would be needed to estimate the mean lifespan of the species of bacteria within a margin of error of 0.75 hours with 95% confidence.
To determine the sample size required to estimate the mean lifespan of a certain species of bacteria within a margin of error of 0.75 hours with a 95% level of confidence, we can use the following formula:
n = [Z*(σ/ME)]^2
where:
n = sample size
Z = the z-score corresponding to the desired level of confidence, which is 1.96 for a 95% level of confidence
σ = the population standard deviation
ME = the desired margin of error
From the given information, we have:
sample mean = Xbar = hours
sample size = n = 35
sample standard deviation = s = hours
desired margin of error = ME = 0.75 hours
level of confidence = 95%, which corresponds to a z-score of 1.96
We do not know the population standard deviation, but we can use the sample standard deviation as an estimate since the sample size is greater than 30. Thus, we have:
σ ≈ s = hours
Substituting the values into the formula, we get:
n = [1.96*(6.81/0.75)]^2 ≈ 311.84
Rounding up to the nearest whole number, we get a sample size of 312 bacteria.
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An IQ test is designed so that the mean is 100 and the standard deviation is 14 for the population of normal adults. Find the sample size necessary to estimate the mean IQ score of statistics students such that it can be said with 99% confidence that the sample mean is within 4 IQ points of the true mean. Assume that sigmaequals14 and determine the required sample size using technology. Then determine if this is a reasonable sample size for a real world calculation.
81 must be the bare minimum acceptable sample size for a real-world computation.
Define Mean?The mean of a group of two or more integers is the straightforward mathematical average. The geometric mean approach, which uses the average of a set of products, and the arithmetic mean technique, which uses the sum of the series' values, are only two of the techniques available to calculate the mean for a given set of data.
Given: For the population of healthy people, the mean IQ score is μ =100 and the standard deviation is б =14.
Significance level : 1-0.99=.01
Critical value : zₐ/2=2.576
Margin of error : E=4
Standard deviation : б =14
The following equation determines the sample size:
n=( zₐ/2×б /E)²
n=(2.576×14/4)²
n=81.288≈81
Hence, the minimum reasonable sample size for a real world calculation must be 81.
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find the median of 14,19,16,13,16,14
Answer:
15
Step-by-step explanation:
Place the number in order from least to greatest. 13,14,14,16,16,19
then take one away from each side till there is one left. 14,14,16,16 14,16.
in this case there is two from this point on you find the average of the two number you have left so in this case, 14+16=30 30/2=15 The median is 15
1. Find the first term of the geometric progression:
b₁, b₂, 4, -8, ... .
a) 1; b) -1; c) 28; d) [tex]\frac{1}{2}[/tex]
2. A geometric progression is given: 1, [tex]\frac{3}{2}[/tex], ... .
Find the number of the member of this progression equal to [tex]\frac{729}{64}[/tex]
a) 5; b) 6; c) 7; d) there is no such number.
3. Find the sum of the first six terms of the geometric progression given by the formula bₙ=3ⁿ⁻²
a) [tex]\frac{728}{3}[/tex]; b) [tex]\frac{727}{6}[/tex]; c) [tex]\frac{727}{2}[/tex]; d) [tex]\frac{364}{3}[/tex]
4. The third term of the geometric progression is 2, and the sixth is 54.
Find the first term of the progression.
a) 1; b) 6; c) [tex]\frac{2}{3}[/tex]; d) [tex]\frac{2}{9}[/tex]
5. The sum of the first and third terms of the geometric progression is 10, and the sum of its second and fourth terms is -20.
What is the sum of the first six terms of the progression?
a) 126; b) -42; c) -44; d) -48
The first term of the geometric progression is 1.
What is geometric progression?
Each term in the sequence preceding it is multiplied by a fixed number called a common ratio to produce the next phrase in a series known as a geometric progression (GP). A geometric number sequence that follows a pattern is another name for this progression.
We are given a geometric progression as b₁, b₂, 4, -8, ....
From this, we get the common ratio as [tex]\frac{-8}{4}[/tex], which is -2.
Now, we know that
a₃ = 4 and r = -2
So,
⇒a₃ = a₁ [tex]r^{n-1}[/tex]
⇒4 = a₁ * [tex]-2^ {3-1}[/tex]
⇒4 = 4a₁
⇒a₁ = 1
Hence, the first term of the geometric progression is 1.
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Since, there are multiple questions, so the question answered above is:
Question: Find the first term of the geometric progression:
b₁, b₂, 4, -8, ...
a) 1; b) -1; c) 28; d) [tex]\frac{1}{2}[/tex]
Any help with this ?
the total number of coins in the museum's collection is:-144 + 90 + 60 + 30 + 10 + 5 = 339 coins.
What is histogram ?
A histogram is a graphical representation of the distribution of a dataset. It is commonly used in statistics to represent the frequency distribution of a set of continuous or discrete data. In a histogram, the data is divided into intervals, or bins, and the frequency of the data falling into each bin is represented by the height of a bar.
The x-axis of a histogram represents the range of values in the dataset, while the y-axis represents the frequency or count of data points falling within each bin. The bars of a histogram are usually drawn touching each other, as the data is continuous and there are no gaps between the bins.
To determine the total number of Roman coins in the museum's collection, we need to know the area under the histogram.
Since we know that 144 coins each weigh between 8 g and 17 g, we can calculate the total weight of those coins:
144 coins x ((17 g - 8 g)/2) = 144 coins x 4.5 g = 648 g
This means that the area of the rectangle representing those coins in the histogram is:
144 coins x 9 g = 1296 g
To find the total number of coins, we need to calculate the area of the remaining rectangles in the histogram. Since the width of each rectangle is 9 g, we can calculate the height of each rectangle by dividing its area by 9 g.
The second rectangle has an area of:
90 coins x 9 g = 810 g
So its height is:
810 g / 9 g = 90 coins
The third rectangle has an area of:
60 coins x 9 g = 540 g
So its height is:
540 g / 9 g = 60 coins
The fourth rectangle has an area of:
30 coins x 9 g = 270 g
So its height is:
270 g / 9 g = 30 coins
The fifth rectangle has an area of:
10 coins x 9 g = 90 g
So its height is:
90 g / 9 g = 10 coins
Finally, the sixth rectangle has an area of:
5 coins x 9 g = 45 g
So its height is:
45 g / 9 g = 5 coins
Therefore, the total number of coins in the museum's collection is:
144 + 90 + 60 + 30 + 10 + 5 = 339 coins.
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Find the nth term of 23,17,11,5
Answer:
Find the nth term of 23,17,11,5:
23,17,11,5,-1,-7,-13...
Three numbers of the repeating decimal produced by the fraction 3/9
The repeating decimal produced by the fraction 3/9 is 0.33333..., with the digit 3 repeating infinitely.
What is fraction?A fraction is a way of expressing a part of a whole or a ratio between two quantities. It is represented as one quantity divided by another quantity, with a horizontal line called a fraction bar between them.
According to question:The fraction 3/9 can be simplified to 1/3 by dividing both the numerator and denominator by their greatest common factor, which is 3.
When we divide 1 by 3, we get a quotient of 0.3, and a remainder of 1. To continue the long division, we add a decimal point and a zero, and bring down the next digit, which is also a zero. We then divide 10 by 3, which gives us a quotient of 3, and a remainder of 1. We repeat the process, adding a decimal point and another zero, and bringing down another zero. We continue this process infinitely, getting a sequence of 3s that repeat without end.
Therefore, the repeating decimal produced by the fraction 3/9 is 0.33333..., with the digit 3 repeating infinitely.
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Please someone answer this for me 30 points
Answer:
Step-by-step explanation:
Find the distance between 9.4− 6.2
Answer: 3.2
Step-by-step explanation: put the 9.4 over the 6.2 (not as a fraction) subtract and then you get 0.2 when you take the .4 - .2 and 9 - 6 is 3 then you would put the 0.2 with the 3 to get 3.2
Calculate the compound interest on 15000 $ for 2 years at 6% p. A
The compound interest on $15000 for 2 years at 6% p. a is $1956 .
To calculate the compound interest on 15000 $ for 2 years at 6% p.a., we can use the formula
A = P(1 + r/n)^(nt)
where:
A = the final amount (including interest)
P = the principal amount (initial investment)
r = the annual interest rate (as a decimal)
n = the number of times the interest is compounded per year
t = the time period (in years)
Here, P = $15000 , r = 6% = 0.06, n = 1 (compounded annually), and t = 2 years.
So, A = 15000 (1 + 0.06/1)^(1*2)
= 15000 (1.06)^2
= $16956
Therefore, the compound interest on $15000 for 2 years at 6% p.a. is $16956 - $15000 = $1956 .
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Use the model below to find 3/5 divided by 2/3
3/5 divided by 2/3 is equal to 9/10. We can also simplify this fraction by dividing both the numerator and the denominator by their greatest common factor, which is 1 in this case.
To divide fractions, we need to invert the second fraction and then multiply the two fractions together. This can be written as:
(a/b) ÷ (c/d) = (a/b) × (d/c)
In this case, a = 3, b = 5, c = 2, and d = 3. Substituting these values into the above equation, we get:
(3/5) ÷ (2/3) = (3/5) × (3/2)
To multiply fractions, we simply multiply their numerators together and their denominators together. So, we can rewrite the above equation as:
(3/5) × (3/2) = (3 × 3) / (5 × 2) = 9/10
Therefore, 3/5 divided by 2/3 is equal to 9/10. We can also simplify this fraction by dividing both the numerator and the denominator by their greatest common factor, which is 1 in this case. Therefore, the final answer is 9/10.
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What is the greatest common factor of −15x2y − 10xy3 5xy4? 5xy 5x2y4 5xy2 xy
the greatest common factor of the given expressions is -5xy.
To find the greatest common factor of the given expressions, we need to factor them first.
[tex]-15x^2y - 10xy^3 + 5xy^4 = -5xy(3x^2 + 2y^2 - y^3)\\5xy = 5xy(1)\\5x^2y^4 = 5xy^4(x^2)\\5xy^2 = 5xy^2(1)[/tex]
xy = xy(1)
Now, we can find the common factors by taking the minimum exponent of each variable in the factors:
The common factors are:5xy
Therefore, the greatest common factor of the given expressions is -5xy.
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find the answer (please i need help asap)
Answer:
[tex]\frac{2xx^{\frac{1}{4} } }{y^{\frac{11}{3} } }[/tex]
Step-by-step explanation:
help!!
On a map, the distance between two cities is 5.6 inches. If the map uses a scale of 2 inches represents 20 miles, what is the actual distance between the two cities in miles?
56 miles
112 miles
50 miles
10.12 miles
Answer:
If 2inches= 20 miles then 1inches =10miles
5.6 inches=5.6*10
=56miles
Pls ad me brainliest.
Answer:
56 miles
Step-by-step explanation:
Use a proportion.
2 inches is to 20 miles as 5.6 inches is to x miles.
2:20 = 5.6:x
2/20 = 5.6/x
1/10 = 5.6/x
1 × x = 10 × 5.6
Cross multiply.
x = 56
Answer: 56 miles
James took a trip of 2400km ,travelling part by bus and part by plane. The average speed of the bus was 60km/h and the speed of the plane was 700km/h. If the total journey took 8hrs , how many kilometres did he travel by plane ?
Answer:
2100 km
Step-by-step explanation:
If the entire trip was 2400 km, then we can note that x km was flown by plane, and 2400 - x km by bus
The whole trip took 8 hours and we know that t = s/v:
[tex]t(by \: plane) = \frac{x}{700} [/tex]
[tex]t(by \: bus) = \frac{2400 - x}{60} [/tex]
Now we can form an equation:
[tex] \frac{x}{700} + \frac{2400 - x}{60} = 8 [/tex]
[tex] \frac{60x + 1680000 - 700x}{42000} = 8[/tex]
[tex] \frac{ - 640x + 1680000}{42000} = 8 [/tex]
Use the property of the proportion:
-640x + 1680000 = 336000
-640x = 336000 - 1680000
-640 x = -1344000 / : (-640)
x = 2100
Since we've noted that x is a path flew by the plane, we have the answer already
If ASTU-AXYZ,
UA is an
altitude of ASTU, ZB is an altitude
of AXYZ, UT = 8.5, UA = 6, and
ZB = 11.4, find ZY.
ASA
Type your answer....
16.15 is the value of ZY in triangle .
What is known as a triangle?
The three vertices of a triangle make it a three-sided polygon. The angles of the triangle are formed by the connection of the three sides end to end at a single point.
The triangle's three angles add up to 180 degrees. There are three straight sides to this two-dimensional shape. An example of a 3-sided polygon is a triangle. Three triangle angles added together equal 180 degrees.
In ΔUST and ΔZXY
UT/ZY = UA/ZB
8.5/ZY = 6/11.4
6 * ZY = 11.4 * 8.5
ZY = 96.9/6
= 16.15
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A student is selected at random to work a problem on the
board.
What is the probability that the student selected is a female
junior?
0.15
0.25
0.20
0.50
The probability that the student selected to work on a problem on the board is C. 0. 20.
How to find the probability ?The total number of students in Junior grade can be found to be 11 by the graph. Out of this 11, the number of female students is:
= 11 - 6
= 5 students
The total number of students in the survey is:
= 7 sophomore + 11 junior + 7 senior
= 25 students
The probability that a female junior student is chosen is:
= 5 / 25 x 100 %
= 1 / 5 x 100 %
= 0. 20
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I need help! I don’t know which are linear or nonlinear! I need help explaining it as well!! Please help me!
Answer: #4 = Non-Linear & #3 = Linear
Step-by-step explanation: Non-Linear lines create curves and not straight lines. As the term non-"line"ar defines not as a line, linear represent straight lines. Hence, #4 is non-linear and #3 is linear in terms of graphing.