Answer:
Mean = 86.067
Median = 85
Step-by-step explanation:
The given data set is
{ 93, 94, 95, 89, 85, 82, 87, 85, 84, 80, 78, 78, 84, 87, 90 }
Number of observations = 15
Formula for mean:
[tex]Mean=\frac{\sum x}{n}[/tex]
where, n is number of observations.
Using the above formula, we get
[tex]Mean=\frac{93+94+95+89+85+82+87+85+84+80+78+78+84+87+90}{15}[/tex]
[tex]Mean=\frac{1291}{15}[/tex]
[tex]Mean\approx 86.067[/tex]
Therefore the mean of the given data set is 86.067.
Arrange the given data set in ascending order.
{ 78, 78, 80, 82, 84, 84, 85, 85, 87, 87, 89, 90, 93, 94, 95 }
Number of observation is 15 which is an odd term. So
[tex]Median=(\frac{n+1}{2})\text{th term}[/tex]
[tex]Median=(\frac{15+1}{2})\text{th term}[/tex]
[tex]Median=8\text{th term}[/tex]
[tex]Median=85[/tex]
Therefore the median of the data set is 85.
What sine function represents an amplitude of 4, a period of pi over 2, no horizontal shift, and a vertical shift of −3?
f(x) = −3 sin 4x + 4
f(x) = 4 sin 4x − 3
f(x) = 4 sin pi over 2x − 3
f(x) = −3 sin pi over 2x + 4
Answer:
[tex]f(x) = 4sin(\frac{\pi}{2}x) - 3[/tex], the third one
Step-by-step explanation:
Explaining the sine function:
The sine function is defined by:
[tex]S = Asin(p(x - x_{0})) + V[/tex]
In which A is the amplitude, [tex]p = \frac{2\pi}{N}[/tex] is the period, [tex]x_{0}[/tex] is the horizontal shift and V is the vertical shift.
So, in your problem:
The amplitude is 4, so A = 4.
The period is [tex]\frac{\pi}{2}[/tex], so [tex]p = \frac{\pi}{2}[/tex].
There is no horizontal shift, so [tex]x_{0} = 0[/tex].
The vertical shift is −3, so V = -3.
The sine function that represents these following conditions is
[tex]f(x) = 4sin(\frac{\pi}{2}x) - 3[/tex], the third one
dy/dt = y^2
y(t) = ?
Answer:
[tex]y(t)=-\frac{1}{t+C}[/tex]
Step-by-step explanation:
We are given that
[tex]\frac{dy}{dt}=y^2[/tex]
We have to find the value of y(t).
[tex]\frac{dy}{dt}=y^2[/tex]
[tex]\frac{dy}{y^2}=dt[/tex]
Integrating on both sides
[tex]\int y^{-2}dy=\int dt[/tex]
We know that [tex]\int x^n dx=\frac{x^{n+1}}{n+1}+C[/tex]
Using the formula
[tex]\frac{y^{-1}}{-1}=t+C[/tex]
[tex]-\frac{1}{y}=t+C[/tex]
[tex]a^{-1}=\frac{1}{a}[/tex]
Taking the reciprocal on both side then , we get
[tex]-y=\frac{1}{t+C}[/tex]
[tex]y(t)=-\frac{1}{t+C}[/tex]
c) Use the Bisection method to find a solution accurate to within 10^-2 for x^4 − 2x^3 − 4x^2 + 4x + 4 = 0 on [0, 2].
Answer:
x ≈ 181/128 ≈ 1.41406
Step-by-step explanation:
The attached table shows the iterations. At each step, the interval containing the root is bisected and the function value at the midpoint of the interval is found. The sign of it relative to the signs of the function values at the ends of the interval tell which half interval contains the root. The process is repeated until the interval width is less than 10^-2.
Interval: [0, 2], signs [+, -], midpoint: 1; sign at midpoint: +
[1, 2] 3/2 -
[1, 3/2] 5/4 +
...
the rest is in the attachment. The listed table values are the successive interval midpoints.
The final midpoint is 181/128 ≈ 1.41406. This is within 0.0002 of the actual root.
_____
The actual solution in the interval [0, 2] is √2 ≈ 1.41421.
To find a solution utilizing the Bisection Method, one needs to establish the function and verify it satisfies the bisection condition. The process is iteratively repeated by adjusting the interval to the midpoint until the error tolerance is reached or the function value of the midpoint is within the desired accuracy.
Explanation:The subject of your question concerns utilizing the Bisection method to solve a certain polynomial equation from a given interval [0, 2] with an accuracy of within 10^-2. The Bisection Method is a root-finding method in numerical analysis to solve for roots in given intervals.
First, establish the function f(x) = x^4 − 2x^3 − 4x^2 + 4x + 4 and set the interval a = 0 and b = 2. The midpoint c = (0 + 2) / 2 = 1.Check whether the configuration of f(0), f(1), and f(2) satisfies the bisection condition. The bisection condition states that the product of function at the end points should be negative i.e., f(a)*f(b) < 0. If it does, the root lies between a and b.Find f(1) and check its product with the values at the end points. If f(a)*f(c) < 0, then the root lies in the first subinterval so b is updated to be c. If not, then root is in the other interval, so a = c.We repeat this process until we get a c value that yields a function value within our desired accuracy or till we reach a point where (b-a)/2 < error tolerance, in this case, 10^-2 .This is an example of how the Bisection Method would be applied in solving for roots of polynomial equations. Do take note that this method only provides approximate solutions and it can be a lengthy process for equations with multiple roots.
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The line contains the point (9,-9) and has the same y-intercept as y + 1 = 4 (x - 2). Write the equation of this line in slope-intercept form.
Answer:
The equation for this line, in slope-intercept form, is given by:
[tex]y = - 9[/tex]
Step-by-step explanation:
The equation of a line in the slope-intercept form has the following format:
[tex]y = ax + b[/tex]
In which a is the slope of the line and b is the y intercept.
Solution:
The line has the same y-intercept as [tex]y + 1 = 4 (x - 2)[/tex].
So, we have to find the y-intercept of this equation
[tex]y + 1 = 4 (x - 2)[/tex]
[tex]y = 4x - 8 - 1[/tex]
[tex]y = 4x - 9[/tex]
This equation, has the y-intercept = -9. Since this line has the same intercept, we have that [tex]b=-9[/tex].
Fow now, the equation of this line is
[tex]y = ax - 9[/tex]
The line contains the point [tex](9,-9)[/tex]
This means that when [tex]x = 9, y = -9[/tex]. We replace this in the equation and find a
[tex]y = ax - 9[/tex]
[tex]-9 = 9a - 9[/tex]
[tex]9a = 0[/tex]
[tex]a = \frac{0}{9}[/tex]
[tex]a = 0[/tex]
The equation for this line, in slope-intercept form, is given by:
[tex]y = - 9[/tex]
Consider a bag containing five red marbles, two green ones, one transparent one, four yellow ones, and two orange ones How many possible sets of five marbles are there in which none of them are red or green? sets Need Help? Tente Tutor
Answer: 21
Step-by-step explanation:
Given : A bag containing five red marbles, two green ones, one transparent one, four yellow ones, and two orange ones .
Total marbles other than red or green = 1+4+2=7
Now, the number of combinations to select five marbles from the set of 7 will be :-
[tex]7C_5=\dfrac{7!}{5!(7-5)!}=\dfrac{7\times6\times5!}{5!\times2!}=21[/tex]
Hence, the number of possible sets of five marbles are there in which none of them are red or green =21
Let x,y \epsilon R. Use mathmatical induction to prove the identity.
x^{n+1}-y^{n+1}=(x-y)(x^{n}+x^{n-1}y+...+xy^{n-1}+y^{n})
Step-by-step explanation:
We will prove by mathematical induction that, for every natural n,
[tex](x-y)(x^{n}+x^{n-1}y+...+xy^{n-1}+y^{n})=x^{n+1}-y^{n+1}[/tex]
We will prove our base case (when n=1) to be true:
Base case:
[tex](x-y)(x^{n}+x^{n-1}y+...+xy^{n-1}+y^{n})=(x-y)(x^{1}+y^{1})=x^2-y^2=x^{1+1}-y^{1+1}[/tex]
Inductive hypothesis:
Given a natural n,
[tex]x^{n+1}-y^{n+1}=(x-y)(x^{n}+x^{n-1}y+...+xy^{n-1}+y^{n})[/tex]
Now, we will assume the inductive hypothesis and then use this assumption, involving n, to prove the statement for n + 1.
Inductive step:
Observe that, for y=0 the conclusion is clear. Then we will assume that [tex]y\neq 0.[/tex]
[tex](x-y)(x^{n+1}+x^{n}y+...+xy^{n}+y^{n+1})=(x-y)y(\frac{x^{n+1}}{y}+x^{n}+...+xy^{n-1}+y^{n})=(x-y)y(\frac{x^{n+1}}{y})+(x-y)y(x^{n}+...+xy^{n-1}+y^{n})=(x-y)y(\frac{x^{n+1}}{y})+y(x^{n+1}-y^{n+1})=(x-y)x^{n+1}+y(x^{n+1}-y^{n+1})=x^{n+2}-yx^{n+1}+yx^{n+1}-y^{n+2}=x^{n+2}-y^{n+2}\\[/tex]
With this we have proved our statement to be true for n+1.
In conlusion, for every natural n,
[tex](x-y)(x^{n}+x^{n-1}y+...+xy^{n-1}+y^{n})=x^{n+1}-y^{n+1}[/tex]
Use the Babylonian method of false position to solve the following
problem,
taken from a clay tablet found in Susa: Let the width of a
rectangle measure a
quarter less than the length. Let 40 be the length of the diagonal.
What are
the length and width? Begin with the assumption that 1 (or 60) is
the length
of the rectangle.
Answer:
length: 32width: 24Step-by-step explanation:
Assume a solution
Assume that 60 is the length. The width is then 1/4 less, or 60 -60/4 = 45.
The diagonal of this rectangle is found using the Pythagorean theorem:
d = √(60² +45²) = √5625 = 75
Make the adjustment
This is a factor of 75/40 larger than the actual diagonal, so the actual dimensions must be 40/75 = 8/15 times those we assumed.
length = (8/15)×60 = 32
width = (8/15)×45 = 24
The length and width of the rectangle are 32 and 24, respectively.
_____
Comment on this solution method
This method is suitable for problems where variables are linearly related. If we were concerned with the area, for example, instead of the diagonal, we would have to adjust the linear dimensions by the square root of the ratio of desired area to "false" area.
Final answer:
This detailed answer explains how to use the Babylonian method of false position to find the length and width of a rectangle.
Explanation:
The Babylonian method of false position involves making an initial assumption about the solution and then iteratively honing in on the correct answer.
Step-by-step:
Let's start with an assumption: Length = 60. Then calculate the width based on the given conditions.
Adjust your assumption based on the calculated width until you reach the correct solution.
By using this method, you can find the length and width of the rectangle described in the problem.
find m angle A
A
10
B
20
C
16
D
14
Answer:
D. 14°
Step-by-step explanation:
The Law of Sines tells you sides are in proportion to the sine of the opposite angle:
sin(A)/BC = sin(B)/AC
sin(A) = BC/AC·sin(B)
A = arcsin(BC/AC·sin(B)) = arcsin(7/28·sin(75°)) ≈ 13.974° ≈ 14°
Suppose a company wants to determine the current percentage of customers who are subjected to their advertisements online. How many customers should the company survey in order to be 98% confident that the estimated (sample) proportion is within 3 percentage points of the true population proportion of customers who are subjected to their advertisements online? z0.10 z0.05 z0.025 z0.01 z0.005 1.282 1.645 1.960 2.326 2.576
Answer: 1503
Step-by-step explanation:
Given : Significance level : [tex]\alpha:1-0.98=0.02[/tex]
Critical value : [tex]z_{\alpha/2}=2.326[/tex]
Margin of error : [tex]E=\pm0.03[/tex]
We know that the formula to find the sample size (the prior true proportion is not available) is given by :-
[tex]n=0.25(\dfrac{z_{\alpha/2}}{E})^2[/tex]
i.e. [tex]n=0.25(\dfrac{2.326}{0.03})^2=1502.85444444\approx1503[/tex]
Hence, the minimum sample size should be 1503.
In a manufacturing operation, a part is produced by machining, polishing, and painting. If there are three machine tools, four polishing tools, and three painting tools, how many different routings (consisting of machining, followed by polishing, and followed by painting) for a part are possible?
Answer:
36Step-by-step explanation:
As per the given question,
In a manufacturing operation, a part is produced by machining, polishing, and painting.
Number of machine tools = 3
Number of polishing tools = 4
Number of painting tools = 3
Now,
For finding the different routing consisting of machining, followed by polishing, and followed by painting, we have to simply multiply the number of machine tools, polishing tools and painting tools.
Therefore,
The different routing (consisting of machining, followed by polishing, and followed by painting) for a part are possible = 3 × 4 × 3 = 36.
Hence, the required answer is 36.
Number of ways a process can be done is the count of total distinguished ways that process can be done. The count of different routings possible for a part is 36
In how many ways, two things with a and b choices be done sequentially?Suppose that a process A can be done in 'a' different ways.
And there is a process following A, call it B, can be done in 'b' different ways. Then, the process A then B can be done in a×b different ways.
This is called rule of product in combinatorics.
Since there are 3 processes to be done subsequently(machining, polishing, then painting), and each of them can be done in 3, 4, and 3 ways respectively, thus,
Total number of routings possible for a part is [tex]3 \times 4 \times 3 = 36[/tex] ways.
Thus, The count of different routings possible for a part is 36
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You deposit $3000 into a money-market savings account which pays 4.8% compounded quarterly, and you make no withdrawals from or further deposits into this account for 3 years. How much money is in your account at the end of those 3 years?
Give answer in dollars rounded to the nearest cent. Do NOT enter "$" sign in answer.
Answer:
$5265.71
Step-by-step explanation:
We have been given that you deposit $3000 into a money-market savings account which pays 4.8% compounded quarterly.
We will use future value formula to solve our given problem.
[tex]FV=C_0\times (1+r)^n[/tex], where,
[tex]C_0=\text{Initial amount}[/tex],
r = Rate of return in decimal form,
n = Number of periods.
[tex]4.8\%=\frac{4.8}{100}=0.048[/tex]
[tex]n=3\times 4=12[/tex]
[tex]FV=\$3,000\times (1+0.048)^{12}[/tex]
[tex]FV=\$3,000\times (1.048)^{12}[/tex]
[tex]FV=\$3,000\times 1.7552354909370114[/tex]
[tex]FV=\$5265.7064\approx \$5265.71[/tex]
Therefore, there will be $5265.71 in your account at the end of those 3 years.
Plato math help please
Answer: option (C)
Step-by-step explanation: The slope of a linear function is undetermined when the line is parallel respect to the y-axis. In the current problem there is no way to observe such geometrical issue, but if we consider how to derive the slope using the following expression; [tex]m=\frac{\Delta y}{\Delta x}= \frac{y_{2}-y_{1}}{x_2-x_{1}}[/tex].
With the previous equation, we have
[tex]a) for P_{1}(-1,1), P_{2}(1,-1) m=\frac{\Delta y}{\Delta x}= \frac{-1-1}{1-(1)}=\frac{-2}{2}=1\\[/tex], therefore the slope is defined
[tex]b) for P_{1}(-2,2), P_{2}(2,2) m=\frac{\Delta y}{\Delta x}= \frac{2-2}{2-(2)}=\frac{0}{4}=0\\[/tex], therefore the slope is defined
[tex]c) for P_{1}(-3,3), P_{2}(-3,3) m=\frac{\Delta y}{\Delta x}= \frac{3-(-3)}{-3-(-3)}=\frac{6}{0}=undetermined\\[/tex]
[tex]d) for P_{1}(-4,4), P_{2}(4,4) m=\frac{\Delta y}{\Delta x}= \frac{4-(-4)}{4-(-4)}=\frac{8}{8}=1\\[/tex]
In this case, the option (C) shows that is not possible to divide over zero. Given such issue, the slope is undetermined and therefore it is a vertical line parallel to y-axis.
Let A be the matrix: [130 024 154 11-4] Find a basis for the nullspace of A.
Answer:
The basis for the null space of A is [tex]{\left[\begin{array}{c}-1&-1&1&0\end{array}\right],\left[\begin{array}{c}-1&1&0&1\end{array}\right]}[/tex]
Step-by-step explanation:
The first step is to find the reduced row echelon form of the matrix:[tex]\left[\begin{array}{cccc}1&0&1&1\\3&2&5&1\\0&4&4&-4\end{array}\right][/tex]
Make zeros in column 1 except the entry at row 1, column 1. Subtract row 1 multiplied by 3 from row 2 [tex]\left(R_2=R_2-\left(3\right)R_1\right)[/tex][tex]\left[\begin{array}{cccc}1&0&1&1\\0&2&2&-2\\0&4&4&-4\end{array}\right][/tex]
Make zeros in column 2 except the entry at row 2, column 2. Subtract row 2 multiplied by 2 from row 3 [tex]\left(R_3=R_3-\left(2\right)R_2\right)[/tex][tex]\left[\begin{array}{cccc}1&0&1&1\\0&2&2&-2\\0&0&0&0\end{array}\right][/tex]
Multiply the second row by 1/2 [tex]\left(R_2=\left(1/2\right)R_2\right)[/tex][tex]\left[\begin{array}{cccc}1&0&1&1\\0&1&1&-1\\0&0&0&0\end{array}\right][/tex]
2. Convert the matrix equation back to an equivalent system and solve the matrix equation
[tex]1x_{1} +x_{3} +1x_{4}=0\\ 1x_{2} +x_{3} -1x_{4}=0\\0=0[/tex]
[tex]\left[\begin{array}{cccc}1&0&1&1\\0&1&1&-1\\0&0&0&0\end{array}\right] \left[\begin{array}{c}x_{1} &x_{2} &x_{3}&x_{4} \end{array}\right]=\left[\begin{array}{c}0&0&0\end{array}\right][/tex]
If we take [tex]x_{3}=t, x_{4}=s[/tex] then [tex]x_{1}=-s-t,x_{2}=s-t,x_{3}=t,x_{4}=s[/tex]
Therefore,
[tex]\boldsymbol{x}=\left[\begin{array}{c}-s-t&s-t&t&s\end{array}\right]=\left[\begin{array}{c}-1&-1&1&0\end{array}\right]t+\left[\begin{array}{c}-1&1&0&1\end{array}\right]s\\\boldsymbol{x}=\left[\begin{array}{c}-1&-1&1&0\end{array}\right]x_{3} +\left[\begin{array}{c}-1&1&0&1\end{array}\right]x_{4}[/tex]
The null space has a basis formed by the set {[tex]{\left[\begin{array}{c}-1&-1&1&0\end{array}\right],\left[\begin{array}{c}-1&1&0&1\end{array}\right]}[/tex]}
April shoots an arrow upward into the air at a speed of 64 feet per second from a platform that is 11 feet high. The height of the arrow is given by the function h(t) = -16t2 + 64t + 11, where t is the time is seconds. What is the maximum height of the arrow?
Answer:
Maximum height of the arrow is 203 feets
Step-by-step explanation:
It is given that,
The height of the arrow as a function of time t is given by :
[tex]h(t)=-16t^2+64t+11[/tex]..........(1)
t is in seconds
We need to find the maximum height of the arrow. For maximum height differentiating equation (1) wrt t as :
[tex]\dfrac{dh(t)}{dt}=0[/tex]
[tex]\dfrac{d(-16t^2+64t+11)}{dt}=0[/tex]
[tex]-32t+64=0[/tex]
t = 2 seconds
Put the value of t in equation (1) as :
[tex]h(t)=-16(2)^2+64(2)+11[/tex]
h(t) = 203 feet
So, the maximum height reached by the arrow is 203 feet. Hence, this is the required solution.
Use the variation of parameters method to solve the DE y"+y'- 2y=1
Answer:
[tex]y(t)\ =\ C_1.e^{-2t}+C_2e^t-\ t.\dfrac{e^{-2t}}{3}-\dfrac{1}{3}[/tex]
Step-by-step explanation:
Given differential equation is,
y"+y'-2y=1
[tex]=>\ (D^2+D-2D)y\ =\ 1[/tex]
To find the complementary function we will write,
[tex]D^2+D-2=0[/tex]
[tex]=>\ D\ =\ \dfrac{-1+\sqrt{1^2+4\times 2\times 1}}{2\times 1}\ or\ \dfrac{-1-\sqrt{1^2+4\times 2\times 1}}{2\times 1}[/tex]
[tex]=>\ D\ =\ -2\ or\ 1[/tex]
Hence, the complementary function can be given by
[tex]y(t)\ =\ C_1e^{-2t}\ +\ C_2e^t[/tex]
Let's say,
[tex]y_1(t)\ =\ e^{-2t}\ \ =>y'_1(t)\ =\ -2e^{-2t}[/tex]
[tex]y_2(t)\ =\ e^{t}\ \ =>y'_2(t)\ =\ e^{t}[/tex]
[tex]g(t)\ =\ 1[/tex]
Wronskian can be given by,
[tex]W\ =\ y_1(t).y'_2(t)\ -\ y_2(t).y'_1(t)[/tex]
[tex]=\ e^{-2t}.e^{t}\ -\ e^{t}.(-2e^{-2t})[/tex]
[tex]=\ e^{-t}\ +\ 2e^{-t}[/tex]
[tex]=\ 3.e^{-t}[/tex]
Now, the particular integral can be given by
[tex]y_p(t)=\ -y_1(t)\int\dfrac{y_2(t).g(t)}{W}dt\ +\ y_2(t)\int\dfrac{y_1(t).g(t)}{W}dt[/tex]
[tex]=\ -e^{-2t}\int\dfrac{e^t.1}{3.e^{-t}}+e^t\int\dfrac{e^{-2t}.1}{3.e^{-t}}dt[/tex]
[tex]=\ -e^{-2t}\int\dfrac{1}{3}dt+\dfrac{e^t}{3}\int e^{-t}dt[/tex]
[tex]=\ \dfrac{-e^{-2t}}{3}.t\ -\ \dfrac{e^t}{3}.e^{-t}[/tex]
[tex]=\ -t.\dfrac{e^{-2t}}{3}-\dfrac{1}{3}[/tex]
Hence, the complete solution can be given by
[tex]y(t)\ =\ C_1.e^{-2t}+C_2e^t-\ t.\dfrac{e^{-2t}}{3}-\dfrac{1}{3}[/tex]
kendra remembered glue.
ally remembered an eraser
sarah remembered scissors
please be more specific
The American Sugar Producers Association wants to estimate
themean yearly sugar consumption. A sample of n = 12 people
revealsthe mean yearly consuption to be 55 pounds with a
standarddeviation of 20 pounds. Find the lower bound for the 98%
confidenceinterval for the mean yearly sugar consumption. Assume
thepopulation is normal.
Answer: 39.308 pounds
Step-by-step explanation:
We assume that the given population is normally distributed.
Given : Significance level : [tex]\alpha: 1-0.98=0.02[/tex]
Sample size : n= 12, which is small sample (n<30), so we use t-test.
Critical value (by using the t-value table)=[tex]t_{n-1, \alpha/2}=t_{11,0.01}=2.718[/tex]
Sample mean : [tex]\overline{x}=50[/tex]
Standard deviation : [tex]\sigma= 20[/tex]
The lower bound of confidence interval is given by :-
[tex]\overline{x}-t_{(n-1,\alpha/2)}\dfrac{\sigma}{\sqrt{n}}[/tex]
i.e. [tex]55-(2.718)\dfrac{20}{\sqrt{12}}[/tex]
[tex]=55-15.6923803166\approx55-15.692=39.308[/tex]
Hence, the lower bound for the 98% confidence interval for the mean yearly sugar consumption= 39.308 pounds
Rewrite the subtraction number sentence as an addition number sentence.
5- (-2)
Answer:
5 + 2
Step-by-step explanation:
We have to rewrite the given statement in addition form.
The integers have property of:
Negative(-) Negative(-) = Positive(+)
Positive(+) Positive(+) = Positive(+)
Positive(+) Negative(-) = Negative(-)
Negative(-) Positive(+) = Negative(-)
The given statement is:
5-(-2)
Since we have two negative together, it is converted into a positive.
Thus, the given statement can be written in positive form as
5 + 2
1/4÷(-2/3) =3/8 she is right now did she get the answer
Answer:
see below for the working
Step-by-step explanation:
Dividing by a number is the same as multiplying by the inverse of that number.
[tex]\displaystyle\frac{\left(\frac{1}{4}\right)}{\left(-\frac{2}{3}\right)}=-\frac{1}{4}\cdot\frac{3}{2}=-\frac{3}{4\cdot 2}=-\frac{3}{8}[/tex]
52.25 is ___% of 1,1050.00
Answer: 0.4729%
Step-by-step explanation:
The formula to find the percent of a part in total amount :-
[tex]\%=\dfrac{\text{Part}}{\text{Total}}\times100[/tex]
Given : Total amount = 1,1050.00
Part of total amount = 52.25
Now, substitute all the values in the formula , we get
[tex]\%=\dfrac{52.25}{11050}\times100\\\\\Rightarrow\ \%=\dfrac{5225}{1105000}\times100=\dfrac{5225}{11050}=0.472850678733\approx0.4729\%[/tex]
Hence, 52.25 is 0.4729% of 1,1050.00.
A researcher wants to compare student loan debt for students who attend four-year public universities with those who attend four –year private universities. She plans to take a random sample of 100 recent graduates of public universities and 100 recent graduates of private universities. Which type of random sampling is utilized in her study design?
Answer:
A simple random sample.
Step-by-step explanation:
A simple random sample is an statistical sample in which each member of a group has the same probability of being chosen. Since the researcher doesn't really have specific characteristics added to the sample other than being from public or private universities, this would be a simple random sample.
The opposite process rule says to solve for ________. a known variable by replicating the process used to form the original equation an unknown variable by reversing the process used to form the original equation an unknown variable by replicating the process used to form the original equation a known variable by reversing the process used to form the original equation
Answer:
An unknown variable by reversing the process used to form the original equation.
Step-by-step explanation:
The opposite process rule says to solve for - an unknown variable by reversing the process used to form the original equation.
If an equation indicates an operation such as addition, subtraction, multiplication, or division, solve for the unknown variable by using the opposite process.
For example:
Lets say we have to find [tex]x+25=35[/tex]
Here 25 is subtracted from both sides of the equation to isolate x.
[tex]x+25-25=35-25[/tex]
we get x = 10
Check this : [tex]10+25=35[/tex]
Final answer:
The opposite process rule is a technique used to solve for an unknown variable by reversing the operations that were used to create the equation. It is a key concept in algebra for finding values of unknown variables.
Explanation:
The opposite process rule refers to solving for an unknown variable by reversing the process used to form the original equation. This is a fundamental technique in solving algebraic equations, necessary for determining the value of the unknown.
To solve for an unknown variable, you follow several steps. Initially, identify the unknowns and known variables. Then, find an equation that expresses the unknown in terms of the knowns. If more than one unknown is present, multiple equations may be needed.
To find the numerical value of the unknown, substitute known values, including their units, into the equation and solve. In algebra, this could mean performing operations such as addition, subtraction, multiplication, or division inversely to isolate the variable.
Find the Cartesian Equation of the plane passing through P(8, -2,0) and perpendicular to a- 5i+3j-k What is the distance of this plane to the point 0(2,2, 2)? (a) (b)
Answer:
equation of plane, 5x+3y-z-36=0
Distance of point (2,2,2) from plane = 4.05 units
Step-by-step explanation:
Given,
Plane passing through the point = (8, -2, 0)
Let's say, [tex]x_1\ =\ 8[/tex]
[tex]y_1\ =\ -2[/tex]
[tex]z_1\ =\ 0[/tex]
Plane perpendicular to the vector, a= 5i + 3j- k
Since, the vector is perpendicular to the plane, hence the equation of plane can be given by
[tex](5i + 3j- k).((x-x_1)i+(y-y_1)j+(z- z_1)k)=\ 0[/tex]
[tex]=>(5i + 3j- k).((x-8)i+(y+2)j+(z-0)k)=\ 0[/tex]
[tex]=>\ 5(x-8)+3(y+2)-z=0[/tex]
[tex]=>\ 5x\ -\ 40\ +\ 3y\ +\ 6\ -\ z\ =\ 0[/tex]
[tex]=>\ 5x\ +\ 3y\ -\ z\ -\ 36\ =\ 0[/tex]
Hence, the equation of plane can be given by, 5x+3y-z-36=0
Now, we have to calculate the distance of the point O(2,2,2) from the plane 5x+3y-z-36=0
Let's say,
a= 5, b= 3, c= -1, d=-36
[tex]x_0=2,\ y_0=2,\ z_0=2[/tex]
So, distance of a point from the plane can be given by,
[tex]d=\dfrac{ax_0+by_0+cz_0+d}{\sqrt{a^2+b^2+c^2}}[/tex]
[tex]=\dfrac{\left |5\times 2+3\times 2+(-1)\times 2-36\right |}{\sqrt{5^2+3^2+(-1)^2}}[/tex]
[tex]=\dfrac{24}{\sqrt{35}}[/tex]
= 4.05 units
So, the distance of the point O(2,2,2) from the given plane will be 4.05 units.
Estimate the product or quotient.
4/7 x 1/6
Answer: I'm sure its 2/21
Step-by-step explanation: you just need to multiply cross sides then divide by any number that works on both of them.
I hope that I answer your question.
Dan worked three hours for eight days.how many hours did he work in total
A certain chalkboard manufacturer determines that their largest blackboard model has a mean length of 5.00 m and a standard deviation of 1.0 cm. A certain school district orders 1000 of these chalkboards. How many are likely to have lengths of under 4.98 m?
Answer:
23 chalkboards
Step-by-step explanation:
Given:
Mean length = 5 m
Standard deviation = 0.01
Number of units ordered = 1000
Now,
The z factor = [tex]\frac{\textup{x - Mean}}{\textup{standard deviation}}[/tex]
or
The z factor = [tex]\frac{\textup{4.98 - 5}}{\textup{0.01}}[/tex]
or
Z = - 2
Now, the Probability P( length < 4.98 )
Also, From z table the p-value = 0.0228
therefore,
P( length < 4.98 ) = 0.0228
Hence, out of 1000 chalkboard ordered (0.0228 × 1000) = 23 chalkboard are likely to have lengths of under 4.98 m.
The amount of money spent on red balloon in a certain college town when the football team is in town is a normal random variable with mean $50000 and a standard deviation of $3000. What proportion of home football game days in this town is less than $45000 worth of red balloons sold?
Answer: 0.0475
Step-by-step explanation:
Given : The amount of money spent on red balloon in a certain college town when the football team is in town is a normal random variable with
[tex]\mu=\$50000[/tex] and [tex]\sigma=\$3000[/tex]
Let x be the random variable that represents the amount of money spent on red balloon.
Using formula [tex]z=\dfrac{x-\mu}{\sigma}[/tex], the z-score corresponding to x= 45000 will be :_
[tex]z=\dfrac{45000-50000}{3000}\approx-1.67[/tex]
Now, by using the standard normal distribution table for z, we have
P value : [tex]P(z<-1.67)=1-P(z<1.67)=1-0.9525=0.0475[/tex]
∴The proportion of home football game days in this town is less than $45000 worth of red balloons sold = 0.0475
Answer the following true or false. Justify your answer.
(a) If A is a subset of B, and x∈B, then x∈A.
(b) The set {(x,y) ∈ R2 | x > 0 and x < 0} is empty.
(c) If A and B are square matrices, then AB is also square.
(d) A and B are subsets of a set S, then A∩B and A∪B are also subsets of S.
(e) For a matrix A, we define A^2 = AA.
Answer:
a) False b) False c) True d) True e) True
Step-by-step explanation:
a) If A is a subset of B, and x∈B, then x∈A. False
Suppose A is Z (Set of Integers), and B is R (Set of Real Numbers). Then A is a subset of B. x ∈ B, let's say x equals π. If x ∈ B (B = Real Numbers) and x=π then x ∉ A (Z).
We could call A, any other subset of Real numbers (Q, I,..) and we both would come up to the same conclusion when it comes to Real numbers the Set.
So this conclusion is False. Not always an element of a subset is an element of a set.
b) False
For this one, I've drawn some lines, and it is useful to work with them.
Given the set {(x,y) ∈ R²| 0<x<0} then all negative and positive numbers but zero belong to this set.
c) If A and B are square matrices, then AB is also square. True
Taking into account the rules for multiplying matrices. The number of columns of A must be the same number of lines of B to there can be a matrix product.
Whenever we multiply square matrices, we'll always get square matrices. Then this conclusion is true.
d) A and B are subsets of a set S, then A∩B and A∪B are also subsets of S. True
Suppose A= Z (Integer Numbers) and B=Q (Rational Numbers) and S= R (Real Numbers)
A∩B = Z∩Q=∅ and A∪B =Z∪Q = subset
Since the ∅ empty set ⊂ in every set and ZUQ is another Subset of R this is a True conclusion.
e) True. For a matrix A, we define A²= AA
For any Power of Matrices, all we have to do is multiply any given matrix by itself for a given number of times.
M²=M*M
M³=M*M*M
A researcher wants to provide a rabbit exactly 162 units ofprotein, 72 units of carbohydrates, and 30 units of vitamin A. The rabbit is fed three types of food. Each gram of Food A has 5 units of protein, 2 units of carbohydrates, and 1unit of vitamin A. Each gram of Food B contains 11 units of protein, 5 units ofcarbohydrates, and 2 units of vitamin A. Each gram of Food C contains 23 units of protein, 11 units of carbohydrates, and 4 units of vitamin A. How many grams of each food should the rabbit be fed?
Answer:
The rabbit should be fed:
[tex]6 + 2z[/tex] grams of food A
[tex]12 - 3z[/tex] grams of food B
[tex]z[/tex] grams of food C
For [tex]z \leq 4[/tex].
Step-by-step explanation:
This can be solved by a system of equations.
I am going to say that x is the number of grams of food A, y is the number of grams of food B and z is the number of grams of Food C.
The problem states that:
A researcher wants to provide a rabbit exactly 162 units of protein:
There are 5 units of protein in each gram of food A, 11 units of protein in each gram of food B and 23 units of protenin in each gram of food C. So
[tex]5x + 11y + 23z = 162[/tex]
A researcher wants to provide a rabbit exactly 72 units of carbohydrates:
There are 2 units of carbohydrates in each gram of food A, 5 units of carbohydrates in each gram of food B and 11 units of carbohydrates in each gram of food C. So:
[tex]2x + 5y + 11z = 72[/tex]
A researcher wants to provide a rabbit exactly 30 units of Vitamin A:
There is 1 unit of Vitamin A in each gram of food A, 2 units of Vitamin A in each gram of food B and 4 units of Vitamin A in each gram of food C. So:
[tex]x + 2y + 4z = 30[/tex].
We have to solve the following system of equations:
[tex]5x + 11y + 23z = 162[/tex]
[tex]2x + 5y + 11z = 72[/tex]
[tex]x + 2y + 4z = 30[/tex].
I think that the easier way to solve this is reducing the augmented matrix of this system.
This system has the following augmented matrix:
[tex]\left[\begin{array}{cccc}5&11&23&162\\2&5&11&72\\1&2&4&30\end{array}\right][/tex]
To help reduce this matrix, i am going to swap the first line with the third
[tex]L_{1} <-> L_{3}[/tex]
Now we have the following matrix:
[tex]\left[\begin{array}{cccc}1&2&4&30\\2&5&11&72\\5&11&23&162\end{array}\right][/tex]
Now i am going to do these following operations, to reduce the first row:
[tex]L_{2} = L_{2} - 2L_{1}[/tex]
[tex]L_{3} = L_{3} - 5L_{1}[/tex]
Now we have
[tex]\left[\begin{array}{cccc}1&2&4&30\\0&1&3&12\\0&1&3&12\end{array}\right][/tex]
Now, to reduce the second row, i do:
[tex]L_{3} = L_{3} - L_{2}[/tex]
The matrix is:
[tex]\left[\begin{array}{cccc}1&2&4&30\\0&1&3&12\\0&0&0&0\end{array}\right][/tex]
This means that z is a free variable, so we are going to write y and x as functions of z.
From the second line, we have
[tex]y + 3z = 12[/tex]
[tex]y = 12 - 3z[/tex]
From the first line, we have
[tex]x + 2y + 4z = 30[/tex]
[tex]x + 2(12 - 3z) + 4z = 30[/tex]
[tex]x + 24 - 6z + 4z = 30[/tex]
[tex]x = 6 + 2z[/tex]
Our solution is: [tex]x = 6 + 2z, y = 12 - 3z, z = z[/tex].
However, we can not give a negative number of grams of a food. So
[tex]y \geq 0[/tex]
[tex]12 - 3z \geq 0[/tex]
[tex]-3z \geq -12 *(-1)[/tex]
[tex]3z \leq 12[/tex]
[tex]z \leq 4[/tex]
The rabbit should be fed:
[tex]6 + 2z[/tex] grams of food A
[tex]12 - 3z[/tex] grams of food B
[tex]z[/tex] grams of food C
For [tex]z \leq 4[/tex].
Two simple statements are connected with "AND." You're constructing the truth table of this compound statement. How many rows does the truth table x will have?
Answer:
4 rows
Step-by-step explanation:
It is given that two statements two be connected with AND, the statements may be either true or false.
The output of the AND will be true if both the statements will be true otherwise false.
We can construct the table as follows:
statement 1 statement 2 output
false false false
false true false
true false false
true true true
Hence, the number of rows the truth will have = 4