Answer:
[tex]x = 1 \ \ \ \text{OR} \ \ \ x = \dfrac{1}{3}[/tex]
Step-by-step explanation:
First, multiply out the set of parentheses and simplify the resulting quadratic expression.
[tex]4(x - 1)(3x - 1) = 0[/tex]
[tex]4(3x^2-x-3x+1) = 0[/tex]
[tex]4(3x^2-4x+1) = 0[/tex]
Then, factor out a 3 from the parentheses to get rid of the coefficient on the quadratic's first term.
[tex]4(3(x^2-\dfrac{4}{3}x+\dfrac{1}{3})) = 0[/tex]
[tex]12(x^2-\dfrac{4}{3}x+\dfrac{1}{3}) = 0[/tex]
Finally, complete the square.
[tex]12\left(x^2-\dfrac{4}{3}x + \left(\dfrac{-\dfrac{4}{3}}{2}\right)^2\right) = 12\left(-\dfrac{1}{3}\right) + 12\left(\dfrac{-\dfrac{4}{3}}{2}\right)^2[/tex]
[tex]12\left(x^2-\dfrac{4}{3}x + \dfrac{4}{9}\right) = -4 + \dfrac{16}{3}[/tex]
[tex]12\left(x - \dfrac{2}{3}\right)^2 = \dfrac{4}{3}[/tex]
[tex]\left(x - \dfrac{2}{3}\right)^2 = \dfrac{1}{9}[/tex]
↓ take the square root of both sides
[tex]x - \dfrac{2}{3}\right = \pm \sqrt{\dfrac{1}{9}}[/tex]
[tex]x = \dfrac{2}{3} \pm \sqrt{\dfrac{1}{9}}[/tex]
[tex]x = \dfrac{2}{3} \pm\dfrac{1}{3}[/tex]
↓ split into two equations
[tex]x = \dfrac{2}{3} + \dfrac{1}{3} \ \ \ \text{OR} \ \ \ x = \dfrac{2}{3} - \dfrac{1}{3}[/tex]
[tex]\boxed{x = 1 \ \ \ \text{OR} \ \ \ x = \dfrac{1}{3}}[/tex]
Determine whether each statement is always, sometimes, or never true.
a. The difference of a binomial and a binomial is a binomial.
Answer Choices:
Always
Sometimes
Never
Question 2
b. When a 6th-degree polynomial with 5 terms is written in standard form, the second term has a degree of 5.
Answer Choices:
Always
Sometimes
Never
Question 3
c. The sum of a 4th-degree polynomial and a 2nd-degree polynomial is a 2nd-degree polynomial.
Answer Choices:
-Always
-Sometimes
-Never
Answer:
a. Never
b. Never
c. Sometimes
Step-by-step explanation:
a. The difference of a binomial and a binomial is never a binomial, as the result will always be another type of expression.
b. When a 6th-degree polynomial with 5 terms is written in standard form, the second term will always have a degree that is less than the 6th degree, since there are only 5 terms and the degree of each term decreases as its position increases.
c. The sum of a 4th-degree polynomial and a 2nd-degree polynomial is sometimes a 2nd-degree polynomial, depending on the coefficients of the terms. It is possible for the degree of the sum to be lower than the degree of both individual polynomials if the coefficients of the higher degree terms cancel out.
The difference of a binomial and a binomial always yields a binomial. A 6th-degree polynomial with 5 terms in standard form always has a degree of 5 for the second term. The sum of a 4th-degree polynomial and a 2nd-degree polynomial never results in a 2nd-degree polynomial.
Explanation:1. For the operation a. The difference of a binomial and a binomial is a binomial.
Answer: Always
Reason: This is true because when you subtract a binomial from another, the result is always a binomial as well. For instance, (x+y)-(x-y) would result in 2y, a binomial.
2. For the operation b. When a 6th-degree polynomial with 5 terms is written in standard form, the second term has a degree of 5.
Answer: Always
Reason: This is always the case because in ordered or standard form, the terms decrease by degree in sequence
3. For the operation c. The sum of a 4th-degree polynomial and a 2nd-degree polynomial is a 2nd-degree polynomial.
Answer: Never
Reason: The highest degree of the sum of two polynomials is the higher degree of the individual polynomials, in this case, it would be a 4th degree polynomial.
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2 2/13 of 52 is _____
The median a data set with nine data values is 36. A tenth value was added to the set, and the median is still 36. If the new value is greater than 36, why did the median not change?
The median did not change because the 5th and 6th term of data is same.
What are mean and median?The mean is the average value which can be calculated by dividing the sum of observations by the number of observations
Mean = Sum of observations/the number of observations
Median represents the middle value of the given data when arranged in a particular order.
Given that;
The median of data set with nine numbers= 36
After the addition of tenth value median= 36
Now,
Median is the middle term of data
Here, the middle value and 6th term must be same.
So, 5th term= 6th term= 36
Therefore, the median of the given data set is same.
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if m<1= 38 degrees and m<2=78. degrees what is m<3
Given two lines with slopes m<1 and m<2, the slope of a third line that is perpendicular to these lines would be the negative reciprocal of either slope. The negative reciprocal of m<1 is -1/m<1 and the negative reciprocal of m<2 is -1/m<2.
Since m<1 = 38 degrees, the negative reciprocal of m<1 would be -1/38.
And since m<2 = 78 degrees, the negative reciprocal of m<2 would be -1/78.
So, if m<3 is the slope of a line perpendicular to the lines with slopes m<1 and m<2, then m<3 could be either -1/38 or -1/78, depending on which slope is chosen.
A car drove at 65 miles per hour 7 hours. How many miles are left if the entire trip is 540 miles ?
Answer: 85 miles left
Step-by-step explanation:
65 miles x 7 hours = 455 miles
540 miles - 455 miles = 85 miles
Write a function that models the data.
The function that models the data is y = 42 ([tex]\frac{1}{2}[/tex])ˣ.
What are Exponential Functions?Exponential functions are functions where the independent variable, x is in the exponent.
From the graph, it is clear that it is an exponential function.
Exponential functions will be of the form y = k bˣ.
We have the point (0, 42).
Substituting the point,
k b⁰ = 42
k = 42, since any number raised to 0 is 1, b⁰ = 1.
So the function is y = 42 bˣ.
Substituting the point (1, 21),
42 b¹ = 21
b = 21 / 42
b = 1/2
So the function is y = 42([tex]\frac{1}{2}[/tex])ˣ.
Hence the function is y = 42([tex]\frac{1}{2}[/tex])ˣ.
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Harper is going to create a graph of the
equation y = -0.5x + 12. Which of the following
will be true about the graph
The graph of the equation y = -0.5x + 12 will be a straight line
How to determine the true statement about the graphThe equation y = -0.5x + 12 represents a linear function
The slope of the line is -0.5The y-intercept (the value of y when x = 0) is 12Based on the slope -0.5 this means that as the value of x increases, the value of y will decrease.
Additionally, since the y-intercept is 12, the line will cross the y-axis at the point (0, 12).
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Divide (-9∠30 ) ÷ (-3∠-30)
After divide, the value of expression (-9∠30 ) ÷ (-3∠-30) is
⇒ (-9∠30 ) ÷ (-3∠-30) = 3
What is Division method?Division method is used to distributing a group of things into equal parts. Division is just opposite of multiplications. For example, dividing 20 by 2 means splitting 20 into 2 equal groups of 10.
Given that;
The expression is,
⇒ (-9∠30 ) ÷ (-3∠-30)
Now, We can divide the expression as;
⇒ (-9∠30 ) ÷ (-3∠-30)
⇒ (-9∠30 ) / (-3∠-30)
⇒ - 9/- 3
⇒ 3
Thus, After divide, the value of expression (-9∠30 ) ÷ (-3∠-30) is
⇒ (-9∠30 ) ÷ (-3∠-30) = 3
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In ΔUVW, w = 7.2 cm, v = 6.2 cm and ∠V=8°.
Find all possible values of ∠W, to the nearest
10th of a degree.
We can use the Law of Sines to find the measure of angle W:
sin(W)/w = sin(V)/v
sin(W) = w*sin(V)/v
sin(W) = 7.2*sin(8°)/6.2
sin(W) ≈ 0.1001
Taking the inverse sine of both sides, we get:
W ≈ 5.78° or W ≈ 174.22°
Since W is an angle in a triangle, it must be between 0° and 180°. Therefore, the only possible value for ∠W is:
W ≈ 5.78° (to the nearest tenth of a degree).
what is the least common denominator for these two fractions
Answer:
Least common denominator is 3.
Step-by-step explanation:
2/3 = 2/3 x 1/1 = 2/3
1/3 = 1/3 x 1/1 = 1/3
LOTS OF POINTS IF U ANSWER RIGHT!!
Graph g(2) = 4 cos (2x) - 2.
Use 3.14 for pi.
Use the sine tool to graph the function. The first point must be on the midline and the second point must be a maximum or minimum value on the graph closest to the first point.
Hermes earns $6)an hour for babysitting. He
wants to earn at least($168) for a new video
game system. Determine the number of
hours he must babysit to earn enough money
for the video game system. Then interpret
the solution.
Answer:
Step-by-step explanation:
Just divide the amount he expects to earn between the payment for each working hour.
[tex]Hours -to-babysit=\frac{168}{6}=28[/tex]
Hermes must babysit 28 hours to earn $168 for his new videogame
Tracked Emails. According to a 2017 Wired magazine article, 40% of emails that are received are tracked using software that can tell the email sender when, where, and on what type of device the email was opened (Wired magazine website). Suppose we randomly select 50 received emails. a. What is the expected number of these emails that are tracked? b. What are the variance and standard deviation for the number of these emails that are tracked? 11. Mailing Machine Malfunctions. A technician services mailing machines at companies in the Phoenix area. Depending on the type of malfunction, the service call can take 1, 2, 3, or 4 hours. The different types of malfunctions occur at about the same frequency. a. Develop a probability distribution for the duration of a service call. b. Draw a graph of the probability distribution. c. Show that your probability distribution satisfies the conditions required for a discrete probability function. d. What is the probability a service call will take three hours? e. A service call has just come in, but the type of malfunction is unknown. It is 3:00 P.M. and service technicians usually get off at 5:00 P.M. What is the probability the service technician will have to work overtime to fix the machine today?
Using standard deviation, the probability that the service technician will have to work overtime to fix the machine today is 0.5.
What does standard deviation mean?The degree of variance or dispersion in a set of data values is measured by standard deviation. It gauges how far the data values depart from the data set's mean (average).
The mean of the data set is first determined, then the standard deviation. The difference between each data point and the mean is then squared for each data point. After dividing the total number of data points by the sum of these squared differences, minus one, the standard deviation is calculated by taking the square root of this result.
a. The expected number of emails that are tracked can be found by multiplying the total number of emails by the probability that an email is tracked:
Expected number of tracked emails = 50 x 0.4 = 20
Therefore, we can expect that 20 out of 50 received emails will be tracked.
b. To find the variance and standard deviation for the number of tracked emails, we can use the formula:
Variance = np(1-p)
Standard deviation = sqrt(np(1-p))
where n is the number of trials (in this case, 50) and p is the probability of success (0.4).
Variance = 50 x 0.4 x (1 - 0.4) = 12
Standard deviation = sqrt(50 x 0.4 x (1 - 0.4)) ≈ 3.46
Therefore, the variance for the number of tracked emails is 12 and the standard deviation is approximately 3.46.
c. The probability distribution for the duration of a service call is:
Duration (hours) Probability
1 0.25
2 0.25
3 0.25
4 0.25
d. The probability that a service call will take three hours is 0.25, as shown in the probability distribution table.
e. To find the probability that the service technician will have to work overtime, we need to calculate the probability that a service call will take longer than two hours, since the technicians usually get off at 5:00 P.M. and it is currently 3:00 P.M.
The probability that a service call will take longer than two hours is:
P(call takes 3 hours or 4 hours) = P(call takes 3 hours) + P(call takes 4 hours) = 0.25 + 0.25 = 0.5
Therefore, the probability that the service technician will have to work overtime to fix the machine today is 0.5.
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Complete the proof.
Statements
AB= 3, BC = 5, and CA = 3.5
LM=6.3, MN = 9, and NL = 5.4
NL 5.4
AB
MN
5.4
3
=
9
||
5
BC
LM 6.3
CA
3.5
9
Octo
=
= 1.8
= 1.8
5
6.3
3.5
N = MN = LM
AABC →ALNM
ZB ZN
= 1.8
Reasons
given
substitution property of equality
simplify
Corresponding angles of similar triangles are congruent.
The proof is completed as follows
Statement Reason
NL/AB = MN/BC = LM/CA ratios of side of similar triangles are equal
Δ ABC is similar to Δ LNM Definition of similar triangles
What are similar triangles?
Similar triangles are triangles that have the same shape but may differ in size. That is to say, they have the same angles but their sides may be scaled differently.
When two triangles are similar, their corresponding angles are congruent and the corresponding sides are in proportion to each other.
This means that if you know the lengths of any two sides of a similar triangle, you can use those ratios to find the lengths of the other sides.
In the proof, the equation NL/AB = MN/BC = LM/CA means that proportions are equal
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Which recursive formula can be used to define this sequence for n > 1?
-3, -6, -12, -24, -48, -96, .
Answer:
The recursive formula for this sequence is y(n) = 2 * y(n-1). Starting with y(1) = -3, this formula produces the sequence of -3, -6, -12, -24, -48, and -96.
If [tex]f(x)=\frac{5x^{4}}{1-x}[/tex] then [tex]f^{4} (x)[/tex]
Note: There is a way of doing this problem without using the quotient rule 4 times.
Answer:
To find the fourth derivative of f(x), we can use the fact that f(x) can be expressed as:
f(x) = 5x^4 (1 - x)^-1
Then, using the product rule repeatedly, we can find the derivatives of f(x) up to the fourth order:
f'(x) = 20x^3 (1 - x)^-1 - 5x^4 (1 - x)^-2
f''(x) = 60x^2 (1 - x)^-1 + 40x^3 (1 - x)^-2 + 10x^4 (1 - x)^-3
f'''(x) = 120x (1 - x)^-1 + 180x^2 (1 - x)^-2 + 120x^3 (1 - x)^-3 + 20x^4 (1 - x)^-4
f^4(x) = 120 (1 - x)^-1 + 720x (1 - x)^-2 + 1080x^2 (1 - x)^-3 + 480x^3 (1 - x)^-4 + 60x^4 (1 - x)^-5
So, we have found the fourth derivative of f(x) without using the quotient rule four times.
The fourth derivative of the function f(x) = 5x⁴/(1 - x)⁻¹ is,
f''''(x) = 120/(1 - x)⁻¹ + 720x/(1 - x)⁻² + 1080x²/(1 - x)⁻³ + 480x³/(1 - x)⁻⁴
+ 60x⁴/(1 - x)⁻⁵.
What is differentiation?A technique for determining a function's derivative is differentiation. Mathematicians use a procedure called differentiation to determine a function's instantaneous rate of change based on one of its variables.
We have to find the fourth derivative of f(x), f(x) = 5x⁴/(1 - x)⁻¹
The derivatives of f(x) up to the fourth order can then be discovered by continually applying the product rule,
f'(x) = 20x³/(1 - x)⁻¹ - 5x⁴/(1 - x)⁻²
f''(x) = 60x²/(1 - x)⁻¹ + 40x³/(1 - x)⁻² + 10x⁴/(1 - x)⁻³
f'''(x) = 120x/(1 - x)⁻¹ + 180x²/(1 - x)⁻² + 120x³/(1 - x)⁻³ + 20x⁴/(1 - x)⁻⁴
f''''(x) = 120/(1 - x)⁻¹ + 720x/(1 - x)⁻² + 1080x²/(1 - x)⁻³ + 480x³/(1 - x)⁻⁴ +
60x⁴/(1 - x)⁻⁵.
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Under her cell phone plan, Paisley pays a flat cost of $60 per month and $3 per gigabyte. She wants to keep her bill under $75 per month. Write and solve an inequality which can be used to determine g g, the number of gigabytes Paisley can use while staying within her budget.
Answer:
Step-by-step explanation:
The inequality to determine the number of gigabytes Paisley can use while staying within her budget can be written as:
60 + 3g < 75
Solving for g:
60 + 3g < 75
-60 -60
0 + 3g < 15
/3 /3
g < 5
So Paisley can use up to 5 gigabytes while staying within her budget.
Which of the following constraints are not linear or cannot be included as a constraint in a linear programming problem?
a. 2X1 + X2 − 3X3 ≥ 50b. 2X1+√X2 ≥ 60c. 4X1 - 1/3 X2 = 75d. 3X1+2X2-3x3/ X1+X2+X3 ≤ 0.9e. 3X1^2 +7X2 ≤ 45
The constraint 3X₁² + 7X₂ ≤ 45 has a degree of two and it cannot be used as constraint in a linear programming problem.
The correct answer is an option (e)
We know that a linear constraint in linear programming occurs when linear components are added or subtracted. Also the resulting expression must either increase, decrease, or be exactly equal to a right-hand side value.
Any constraint of a linear programming problem is referred to as linear if all of its terms are of the first order.
We know that the degree of the linear constraint is one, hence the constraint that does not have a degree of one is not a linear constraint.
Here we can observe that the constraint 3X₁² + 7X₂ ≤ 45 has a degree of two and it cannot be used as constraint in a linear programming problem.
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The complete question is:
Which of the following constraints are not linear or cannot be included as a constraint in a linear programming problem?
a. 2X₁ + X₂ − 3X₃ ≥ 50
b. 2X₁ + √X₂ ≥ 60
c. 4X₁ - 1/3 X₂ = 75
d. 3X₁ + 2X₂ - 3x₃ / X₁ + X₂ + X₃ ≤ 0.9
e. 3X₁² + 7X₂ ≤ 45
8)
Mariah is planting a rectangular rose
garden. In the center of the garden,
she puts a smaller rectangular patch
of grass. The grass is 2 ft by 3 ft. What
is the area of the rose garden?
Rose
Garden
9ft
10ft
Patch of Grass
2ft 3ft
Answer:
Step-by-step explanation:
133 ft
do yall know this awser?
The missing side length is 7 yd.
What is the missing side length?The object given is made up of two rectangles. The width of the upright rectangle is to be determined. In order to determine this value, the mathematical operation that would be used is subtraction.
Subtraction is the process of determining the difference between two or more numbers. The sign that is used to represent subtraction is -.
Width of the upright rectangle = 15 - 8 = 7 yd
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Let −2 ≤ x ≤ 5 and a ≤ 4x + 1 ≤ b
If −2 ≤ x ≤ 5 and a ≤ 4x + 1 ≤ b, then the inequality can be written as:
−7 ≤ 4x + 1 ≤ 21
What is expression ?
An expression in mathematics is a combination of numbers, variables, and mathematical operations, such as addition, subtraction, multiplication, and division, that represents a value or a quantity. Expressions can be simple or complex, and they can be written in various forms, such as using variables, exponents, radicals, logarithms, trigonometric functions, and more.
For example, 2x + 5 is an expression that contains a variable x and represents a value that depends on the value of x. Another example is √(a^2 + b^2), which is an expression that contains two variables a and b and represents the square root of the sum of their squares.
According to given condition :
We know that −2 ≤ x ≤ 5. Therefore, the smallest possible value of 4x is −8 (when x = −2) and the largest possible value of 4x is 20 (when x = 5). Adding 1 to both sides of the inequality, we get:
−8 + 1 ≤ 4x + 1 ≤ 20 + 1
−7 ≤ 4x + 1 ≤ 21
So, a = −7 and b = 21.
Therefore, if −2 ≤ x ≤ 5 and a ≤ 4x + 1 ≤ b, then the inequality can be written as:
−7 ≤ 4x + 1 ≤ 21
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Greg's age is 6 less than 5 times Rachel's age. In four years the sum of their ages will be 20. How old is each person now?
Answer:
Rachels age = 3 years
Greg's age = 9 years
Step-by-step explanation:
Framing algebraic equations and solving:Present age:
Let Rachels age = x years
5 time of Rachel's age = 5*x = 5x
6 less than 5x = 5x - 6
Greg's age = (5x - 6) years
Age after four years:
Rachel's age = (x + 4) years
Greg's age = 5x - 6 + 4
= ( 5x - 2) years
Sum of their ages = 20
x + 4 + 5x - 2 = 20
x + 5x + 4 - 2 = 20
Combine like terms,
6x + 2 = 20
Subtract 2 from both sides,
6x = 20 - 2
6x = 18
Divide both sides by 6,
x = 18 ÷ 6
x = 3
Rachel's age = 3 years
Greg's age = 5*3 - 6
= 15 - 6
= 9 years
Please help me and explain how to do this
The scale factor of figure A to figure B is 5/3.
What is Triangle?A triangle is a three-sided polygon that consists of three edges and three vertices.
Two triangles are said to be similar if their corresponding angles are congruent and the corresponding sides are in proportion .
A and B are similar triangles.
We need to find the scale factor.
The ratio between the scale of a given original object and a new object
Scale factor is 15/9=35/21=40/24
5/3=5/3=5/3
Hence, 5/3 is the scale factor of figure A to figure B.
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Which trig function could
be used to solve for the
length of side c using the
50 degree angle?
A. sine
B. cosine
C. tangent
C
14
50°
Answer:
C
Step-by-step explanation:
in the triangle with respect to the 50° angle, the side opposite is c and the adjacent side is 14.
thus using the tangent ratio in the right triangle
tan50° = [tex]\frac{opposite}{adjacent}[/tex] = [tex]\frac{c}{14}[/tex] ( multiply both sides by 14 )
14 × tan50° = c , then
c ≈ 16.7 ( to 1 decimal place )
In this problem, the cosine function is used to solve for the length of side C in a right-angled triangle, because the angle and the adjacent side are known. According to trigonometry, the cosine for an angle is the length of the adjacent side divided by the hypotenuse.
Explanation:In the given right-angled triangle, since the length of side C (hypotenuse) is unknown and one of the acute angles (50 degrees) is known, you should use the cosine function to solve for the length of side C. According to Trigonometry, cosine of an angle (in a right-angled triangle) is equal to the adjacent side divided by the hypotenuse. Hence, cos(50) = 14 / C. You could solve this equation for C.
Note that:
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The line y = 3x – 8 cuts the x-axis at point D. what are the coordinates of D?
The coordinates of D on the given line segment is (8/3, 0).
What are the coordinates of midpoint of the line segment AB?Suppose we've two endpoints of a line segment as:
A(p,q), and B(m,n)
Then let the midpoint be M(x,y) on that line segment. Then, its coordinates are:
[tex]x = \dfrac{p+m}{2}[/tex]
and
[tex]y = \dfrac{q+n}{2}[/tex]
We are given that;
y = 3x – 8
Now,
When a line cuts the x-axis, its y-coordinate is always 0. Therefore, we can substitute y = 0 into the equation y = 3x - 8 and solve for x:
0 = 3x - 8
3x = 8
x = 8/3
Therefore, the point D has coordinates (8/3, 0).
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The average income, I, in dollars, of a lawyer with an age of x years is modeled with the following function:
I=-425x^(2) + 45,500x-650,000
What is the youngest age for which the average income of a lawyer is $275,000
The youngest age for which the average income of a lawyer is $275,000 is 27.91 year.
Quadratic Equation helps solve quadratic equations. First, put the equation into the form ax²+bx+c=0. where a, b, and c are the coefficients. Then plug these coefficients into the equation.
(-b±√(b²-4ac))/(2a) . See examples of solving various equations using formulas
The average annual income, I, in dollars, of a lawyer with an age of x years is modeled with with the following function:
I = - 425x² + 45500x - 650000 .......... (1)
If the average annual income of the lawyer at the age of x years is $275000, then from the equation (1) we can write
- 425x² + 45500x - 650000 = 250000
I=-425x^(2) + 45,500x-650,000
275000 = -425x^(2) + 45,500x-650,000
-425x^(2) + 45,500x -650000-275000=0
425x^(2) -45,500x +925000=0
x = 900/17 ± 10√(1810)/17
= 77.96 and 27.91
here we are not accepting the ans 77.96 because we have already less value which is 27.91 so final ans will be 27.91
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Find an estimate of the total distance traveled in the first 6 hours of travel for a particle whose velocity is given by
v(t)=−t^2 +4t+6
where v is in MPH and t is in hours.
Estimate of the total distance traveled in the first 6 hours of travel for a particle v(t)=−t^2 +4t+6 is 36m.
We have v(t)=−t² +4t+6
For finding the distance we have to find the integration of the given equation:
s = ∫ -t² +4t+6
= -t³/3 + 4t²/2 + 6t
= -t³/3 + 2t²/ + 6t
For the value of t = 6 hours
= -6³/3 + 2(6)² + 6(6)
= -72 + 72 + 36
= 36
Estimate of the total distance traveled in the first 6 hours is 36 m.
When a moving object has a positive velocity, its position is constantly rising. (We focus on the case when velocity is always positive; we will soon explore cases where velocity is negative.) We have shown that the area under the velocity curve represents the precise distance travelled whenever is constant on an interval. Finding the areas of rectangles that closely resemble the area under the velocity curve allows us to calculate the total distance travelled when is not constant.
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When conducting a survey, which of the following is the most importantreason to avoid using a volunteer sample?
A. In order to get stronger opinions expressed.
B. Your conclusions could not be reliably generalized to a larger population.
C. You might not get a significant result.
D. To ensure truthful answers to the survey's questions.
The most important reason to avoid using a volunteer sample is Your conclusions could not be reliably generalized to a larger population.
Then, we want to determine the most important reason to avoid using a volunteering sample.
A levy sample is a slice system where people can choose whether or not they share in the check. While easier, this system can beget issues statistically.
The primary issue that this slice fashion faces is that the sample won't be arbitrary. You'll probably get people who are more opinioned about the subject the sample enterprises. This means that the sample won't truly be arbitrary, which in turn means it'll not be representative of the population. However, also the conclusions from the sample can not be generalized to the population, If the sample isn't representative of the population.
Thus, the answer is B. Your conclusions couldn't be reliably generalized to a larger population.
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Find the effective rate corresponding to the following nominal rate.5% compounded continuously.
The effective rate for a nominal rate of 5% compounded continuously over a time period of 1 year is 5.13%.
To find the effective rate corresponding to a nominal rate compounded continuously, we use the formula:
r_effective = [tex]e^{(r\_nominal * t)} - 1[/tex]
where r_nominal is the nominal rate, and t is the time period.
For a nominal rate of 5% compounded continuously, the effective rate can be calculated as follows:
r_effective = [tex]e^{(0.05*t)}-1[/tex]
Note that the time period t is usually expressed in years. For example, if we want to find the effective rate for a time period of 1 year, we have:
r_effective = [tex]e^{(0.05*t)}-1[/tex]
= 1.051296 - 1
= 0.051296 or 5.13%
So, the effective rate for a nominal rate of 5% compounded continuously over a time period of 1 year is 5.13%.
It's important to understand the difference between nominal and effective rates. The nominal rate is the rate that is advertised or quoted, while the effective rate takes into account the frequency of compounding. The effective rate is a more accurate representation of the true interest rate because it shows the actual amount of interest earned over a given time period.
Continuous compounding means that interest is calculated and added to the principal continuously, rather than at regular intervals. This results in a higher effective rate compared to the same nominal rate compounded at regular intervals.
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a battleship simultaneously fires two shells toward two identical enemy ships. one shell hits ship a, which is close by, and the other hits ship b, which is farther away. the two shells are fired at the same speed. assume that air resistance is negligible and that the magnitude of the acceleration due to gravity is g .
The magnitude of the acceleration due to gravity would decrease with increasing height.
If the two shells were fired simultaneously with the same speed, their initial velocity would be the same. However, the shell that hits ship A, which is closer, would take less time to reach its target compared to the shell that hits ship B.
Since the magnitude of the acceleration due to gravity is constant, the vertical motion of the shells would be described by the following equation:
h = vi * t + (1/2) * g * [tex]t^2[/tex]
where h is the height of the shell, vi is the initial velocity, t is the time, and g is the acceleration due to gravity.
The horizontal motion of the shells would be described by the following equation:
d = vi * t
where d is the horizontal distance travelled by the shell.
By solving the above equations, we can determine the time taken by each shell to reach its target and therefore, the time difference between the two shells.
Note that this analysis assumes that air resistance is negligible and that the magnitude of the acceleration due to gravity is constant. In reality, air resistance would play a role in the motion of the shells, and the magnitude of the acceleration due to gravity would decrease with increasing height.
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