Find the exact value of each expressionfunctio
1. (a) sin ^−1(0.5)
(b) cos^−1(−1) 2. (a) tan^−1√3
​ b) sec ^-1(2)

The probability that X equals to 1 is 1-1/e.

The probability of X=1 is 1/e for the random variable X given as:

P[X≤x]=1−e−x

For x ≥ 1 and P[X≤x]=0 for x < 1.

Definition: The probability mass function of a discrete random variable X is defined for all real numbers x by P(X = x) = p(x), where p(x) satisfies the following three conditions:

1. p(x) ≥ 0, for all x.

2. p(x) ≤ 1, for all x.

3. Σp(x) = 1,

where the sum extends over all values x that X may take.

Proof: P[X=1]=P[X≤1]-P[X<1]=1-e^(-1)-0=1-(1/e).

So the probability that X equals to 1 is 1-1/e.

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The first column of the matrix of change of basis from B to B' is given by the column vector [5, 2].

The matrix A represents the change of basis from B to B'. Each column of A corresponds to the coordinates of a basis vector in the new basis B'.

In this case, the first column of A is [5, 2]. This means that the first basis vector of B' can be represented as 5 times the first basis vector of B plus 2 times the second basis vector of B.

Therefore, the first column of the matrix of change of basis from B to B' is [5, 2].

The first column of the matrix of change of basis from B to B' is given by the column vector [5, 2].

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Answer:

So look at the 9 and move 2 spaces and that is where the dote is going to be.

Step-by-step explanation:

So from the sinter of the graph which is 0 you would want to move right 2 and move up 9.

The point-slope form of the line that passes through the given point with the given slope is explained below:The formula for the point-slope form of a linear equation is:$$y-y_1 = m(x-x_1)$$where (x1,y1) is a point on the line and m is the slope of the line.

Since we have a four-dimensional point with the given coordinates (4, 8, 1, 8), we'll assume that the first three coordinates (x1, y1, z1) are our point, and the last coordinate is a fourth dimension we don't need for a line in three-dimensional space. So, the given point is (4, 8, 1), and the slope is m=2.8.To find the equation of the line, we can plug in the given values into the point-slope form as follows:$$y - 8 = 2.8(x - 4)$$

This is the point-slope form of the line that passes through the point (4, 8, 1) with slope m=2.8. The equation can be simplified by distributing 2.8 on the right-hand side to get:$$y - 8 = 2.8x - 11.2$$Finally, we can move -8 to the right-hand side of the equation and get the slope-intercept form as:$$y = 2.8x - 3.2$$This is the equation of the line in slope-intercept form, where the slope is 2.8 and the y-intercept is -3.2.

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The occupancy rate is 70%.Hence, the correct option is c. 70%.

Given information:Number of Rooms: 20

No of Nights in a Year: 365

Nights Booked: 5110

We are supposed to calculate the occupancy rate, given that the number of rooms is 20 and the total number of nights in a year is 365 nights.The formula to calculate the occupancy rate is given by:

Occupancy Rate = (Total Number of Rooms Nights Occupied / Total Number of Rooms Nights Available) × 100

Where,Total Number of Rooms Nights Available = (Number of Rooms) × (No of Nights in a Year)

We are given that the Number of Rooms is 20 and No of Nights in a Year is 365.Then,Total Number of Rooms Nights Available = 20 × 365= 7300

Now, we know that Nights Booked is 5110.So, Total Number of Rooms Nights Occupied = 5110

Therefore, Occupancy Rate = (5110 / 7300) × 100= 70%

Therefore, the occupancy rate is 70%.Hence, the correct option is c. 70%.

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Main Answer:In the given question, we need to find the number of students who are selling back history and math books but not business books, the number of students selling back exactly two of these three types of books and the number of students selling back at most two of these three types of books. We can solve these using a Venn diagram or the Principle of Inclusion-Exclusion.Using Principle of Inclusion-Exclusion, we can find the number of students selling back history and math books but not business books as follows:Number of students returning history books only = 19 - (9 + 5 + 3) = 2Number of students returning math books only = 19 - (9 + 5 + 3) = 2Number of students returning both math and history books but not business books = (9 + 5 + 3) - 19 = -1 (Since this value is not possible, we take it as 0)Therefore, the number of students selling back history and math books but not business books = 2 + 2 - 0 = 4.Answer in more than 100 words:Let A, B, and C be the sets of students returning math, history, and business books, respectively. We can use the information given in the question to create a Venn diagram and fill in the values as follows:From the above Venn diagram, we can find the number of students selling back exactly two of these three types of books as follows:Number of students returning only math books = 8Number of students returning only history books = 2Number of students returning only business books = 12Therefore, the number of students selling back exactly two of these three types of books = 8 + 2 + 12 = 22.To find the number of students selling back at most two of these three types of books, we need to consider all possible combinations of sets A, B, and C as follows:No set: 0 studentsExactly one set: (19-9-5-3)+(19-9-5-3)+(21-9-5-3) = 9+9+4 = 22Exactly two sets: 22 students (calculated above)All three sets: 3 studentsTherefore, the number of students selling back at most two of these three types of books = 0 + 22 + 3 = 25.Conclusion:Therefore, the number of students selling back history and math books but not business books is 4, the number of students selling back exactly two of these three types of books is 22, and the number of students selling back at most two of these three types of books is 25.

The trigonometric formula 2 tan (x/2) can be made simpler by using the half-angle identities. Where x is the angle in radians, the half-angle identity for a tangent is tan(x/2) = sin(x)/(1 + cos(x)).

We obtain 2 sin(x)/(1 + cos(x)) by substituting this identity into the expression. By multiplying the numerator and denominator by the conjugate of the denominator, which is 1 - cos(x), we can further reduce the complexity of the equation. As a result, we get 2 sin(x)(1 - cos(x))/(1 - cos2(x)). The expression can be rewritten as 2 sin(x)(1 - cos(x))/(sin(x)), which is based on the Pythagorean identity sin(2x) + cos(2x) = 1. Finally, we arrive at the abbreviated equation 2(1 - cos(x))/sin(x) by eliminating sin(x) from the numerator and denominator.

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The incenter Theorem states that the angle bisectors of a triangle intersect at a point equidistant from the sides.

using the Angle Bisector Theorem and the congruence of triangles.

Incenter theorem can use the properties of angle bisectors and the concept of congruent triangles.

Triangle ABC

The angle bisectors of triangle ABC intersect at a point equidistant from the sides.

Draw the triangle ABC.

Let the angle bisectors of angles A, B, and C meet the opposite sides at points D, E, and F, respectively.

Prove that the distances from the incenter denoted as I to the sides of the triangle are equal.

Consider angle A.

Since AD is the angle bisector of angle A, it divides angle A into two congruent angles.

Let's denote them as ∠DAB and ∠DAC.

By the Angle Bisector Theorem, we have,

(AB/BD) = (AC/CD) ___(1)

Similarly, considering angle B and angle C,

(CB/CE) = (BA/AE) ___(2)

(CA/FA) = (CB/BF) ____(3)

Rearranging equations (1), (2), and (3), we get,

AB/BD = AC/CD

CB/CE = BA/AE

CA/FA = CB/BF

Rearranging equation (1), we get,

AB/BD = AC/CD

AB × CD = AC × BD

Similarly, rearranging equations (2) and (3), we get,

CB × AE = BA × CE

CA × BF = CB × FA

Now, consider triangles ABD and ACD.

According to the Side-Angle-Side (SAS) congruence ,

AB × CD = AC× BD

Angle DAB = Angle DAC (common angle)

Therefore, triangles ABD and ACD are congruent.

By congruence, corresponding parts are congruent.

AD = AD (common side)

Angle DAB = Angle DAC (corresponding congruent angles)

Similarly, prove that triangles ECB and ACB are congruent,

BC ×AE = BA × CE

Angle CBE = Angle CBA

Therefore, triangles BCE and ACB are congruent.

By congruence, corresponding parts are congruent.

BE = BE (common side)

Angle EBC = Angle EBA (corresponding congruent angles)

prove that triangles CAF and BAC are congruent:

CA × BF = CB ×FA

Angle ACF = Angle ACB

Therefore, triangles CAF and BAC are congruent.

By congruence, corresponding parts are congruent.

FA = FA (common side)

Angle FCA = Angle FCB (corresponding congruent angles)

Points D, E, and F are equidistant from the sides of triangle ABC.

The angle bisectors of triangle ABC intersect at a point I, called the incenter, which is equidistant from the sides.

Hence, the incenter theorem is proven.

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Recurrence relation refers to the relationship between the terms in a sequence. There are two methods of finding the formula that generates the following sequence.

Method 1: Working upward, forward substitution

Method 2: Working downward, backward substitution.

We will use both methods to find the formula for the given sequence. Let's solve each one separately. Method 1: Working upward, forward substitutionWe are given the sequence: 1, 2, 3, ...This sequence is an arithmetic sequence with a common difference of 1. Hence, the nth term of the sequence is given by the formula: an = a1 + (n - 1)d where a1 is the first term, n is the number of terms, and d is the common difference of the sequence. Putting a1 = 1 and d = 1, we get an = 1 + (n - 1)1 = n Thus, the formula for generating the sequence 1, 2, 3, ... is an = n.

Method 2: Working downward, backward substitutionWe are given the sequence: 1, 2, 3, ...This sequence is an arithmetic sequence with a common difference of 1. Hence, the nth term of the sequence is given by the formula: an = a1 + (n - 1)d where a1 is the first term, n is the number of terms, and d is the common difference of the sequence. Putting a1 = 1 and d = 1, we get an = 1 + (n - 1)1 = n Thus, the formula for generating the sequence 1, 2, 3, ... is an = n. Thus, the formula for generating the sequence 1, 2, 3, ... is an = n.

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Theorem states that let k be any natural number. Then there is a natural number n that will be much larger than k such that no natural number greater than 1 and less than k will divide n. This theorem gives the existence of the prime numbers, which are the building blocks of number theory.

The Theorem states that let k be any natural number. Then there is a natural number n that will be much larger than k such that no natural number greater than 1 and less than k will divide n. The fundamental theorem of arithmetic states that every natural number greater than 1 is either a prime number itself or can be factored as a product of prime numbers in a unique way.

This theorem gives the existence of the prime numbers, which are the building blocks of number theory. Euclid's proof of the existence of an infinite number of prime numbers is a classic example of the use of contradiction in mathematics.The theorem can be proved by contradiction.

Suppose the theorem is false and that there is a smallest natural number k for which there is no natural number n such that no natural number less than k and greater than 1 divides n. If this is the case, then there must be some natural number m such that m is the product of primes p1, p2, …, pt, where p1 < p2 < … < pt.

Then, by assumption, there is no natural number less than k and greater than 1 that divides m. So, in particular, p1 > k, which means that k is not the smallest natural number for which the theorem fails. This contradicts the assumption that there is a smallest natural number k for which the theorem fails.

In conclusion, Theorem states that let k be any natural number. Then there is a natural number n that will be much larger than k such that no natural number greater than 1 and less than k will divide n. This theorem gives the existence of the prime numbers, which are the building blocks of number theory.

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The slope of the line [tex]\(y = \frac{3}{5}x - \frac{2}{7}\)[/tex] is [tex]\rm \(\frac{3}{5}\)[/tex].

The equation of a line in slope-intercept form is given by [tex]\(y = mx + b\)[/tex], where m represents the slope of the line. Comparing the given equation

[tex]\(y = \frac{3}{5}x - \frac{2}{7}\)[/tex]

with the slope-intercept form, we can see that the coefficient of x is [tex]\rm \(\frac{3}{5}\)[/tex]. This coefficient represents the slope of the line.

The slope of a line indicates the steepness or inclination of the line. In this case, the slope [tex]\rm \(\frac{3}{5}\)[/tex] means that for every unit increase in the x-coordinate, the corresponding y-coordinate will increase by [tex]\rm \(\frac{3}{5}\)[/tex] units.

Simplifying the slope [tex]\rm \(\frac{3}{5}\)[/tex] gives us a proper fraction, which means the numerator is smaller than the denominator. Therefore, the slope of the line is [tex]\rm \(\frac{3}{5}\)[/tex].

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The following 2-dimensional transformations can be represented as matrices:

a. Rotation

c. Translation

d. Reflection

Rotation, translation, and reflection transformations can all be represented using matrices. Rotation matrices represent rotations around a specific point or the origin. Translation matrices represent translations in the x and y directions. Reflection matrices represent reflections across a line or axis.

Magnification, on the other hand, is not represented by a single matrix but involves scaling the coordinates of the points. Therefore, magnification is not represented directly as a matrix transformation.

So the correct options are:

a. Rotation

c. Translation

d. Reflection

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We should select 70 bags of cookies.

The standard deviation of the sample mean is given by:

standard deviation of sample mean = standard deviation of population / sqrt(sample size)

We know that the standard deviation of the population is 1.0 oz, and we want the standard deviation of the sample mean to be 0.12 oz. So we can rearrange the formula to solve for the sample size:

sample size = (standard deviation of population / standard deviation of sample mean)^2

Plugging in the values, we get:

sample size = (1.0 / 0.12)^2 = 69.44

Since we can't select a fraction of a bag, we round up to the nearest whole number to get the final answer. Therefore, we should select 70 bags of cookies.

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The total cost of shirts (15S) and the cost of the shoes (35) combined is less than or equal to Lisa's budget of $137.

To represent the scenario where Lisa wants to buy some shirts and a pair of shoes within her budget, we can set up an inequality.

Let S represent the number of shirts Lisa buys.

The cost of each shirt is $15, so the total cost of the shirts is 15S.

The cost of the pair of shoes is $35.

Lisa's budget is $137.

Therefore, the inequality that describes this scenario is:

15S + 35 ≤ 137

This inequality ensures that the total cost of shirts (15S) and the cost of the shoes (35) combined is less than or equal to Lisa's budget of $137.

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The exact solutions of the equation [tex]2sin^2(x) + 3sin(x) = -1[/tex] in the interval [0, 2π) are x = 7π/6, 11π/6, 3π/2, and 7π/2.

To solve the equation [tex]2sin^2(x) + 3sin(x) = -1[/tex] in the interval [0, 2π), we can rewrite it as a quadratic equation by substituting sin(x) = t. The equation becomes:

[tex]2t^2 + 3t + 1 = 0[/tex]

Now we can solve this quadratic equation for t. Factoring the equation, we have:

(2t + 1)(t + 1) = 0

This gives two possible values for t:

2t + 1 = 0 or t + 1 = 0

Solving these equations, we find:

t = -1/2 or t = -1

Since sin(x) = t, we can substitute back to find the values of x:

sin(x) = -1/2 or sin(x) = -1

For sin(x) = -1/2, we know that the solutions lie in the third and fourth quadrants. The reference angle for sin(x) = 1/2 is π/6, so the solutions for sin(x) = -1/2 are:

x = 7π/6 or x = 11π/6

For sin(x) = -1, we know that the solutions lie in the third and fourth quadrants. The reference angle for sin(x) = 1 is π/2, so the solutions for sin(x) = -1 are:

x = 3π/2 or x = 7π/2

Putting all the solutions together, we have:

x = 7π/6, 11π/6, 3π/2, 7π/2

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The expression (4c+a^(2))/(c) when a=4 and c=2, we substitute the given values for a and c into the expression and simplify it using the order of operations.

Evaluate the expression (4c + a^2)/c when a = 4 and c = 2, we substitute the given values into the expression. First, we calculate the value of a^2: a^2 = 4^2 = 16. Then, we substitute the values of a^2, c, and 4c into the expression: (4c + a^2)/c = (4 * 2 + 16)/2 = (8 + 16)/2 = 24/2 = 12. Therefore, when a = 4 and c = 2, the expression (4c + a^2)/c evaluates to 12.

First, substitute a=4 and c=2 into the expression:

(4(2)+4^(2))/(2)

Next, simplify using the order of operations:

(8+16)/2

= 24/2

= 12

Therefore, the value of the expression (4c+a^(2))/(c) when a=4 and c=2 is 12.

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In both cases, we have shown that |x| - |y| ≤ |x - y| holds true for all x and y in the real numbers.a) The condition for |x + y| = |x| + |y| to be true is when x and y have the same sign or when one of them is zero.

To prove this, let's consider the two cases:

1. When x and y have the same sign: Without loss of generality, assume x and y are positive. In this case, |x + y| = x + y and |x| + |y| = x + y. Thus, the condition holds.

2. When one of x or y is zero: Without loss of generality, assume x = 0. In this case, |x + y| = |0 + y| = |y| and |x| + |y| = |0| + |y| = |y|. Again, the condition holds.

Now, let's prove that failing the condition implies strict inequality:

When x and y have different signs: Without loss of generality, assume x > 0 and y < 0. In this case, |x + y| = |x| - |y|, which is less than |x| + |y|. Therefore, failing the condition implies strict inequality.

b) To prove |x| - |y| ≤ |x - y|, we consider two cases:

1. When x ≥ y: In this case, |x - y| = x - y. Also, |x| - |y| = x - y (since both x and y are non-negative). Therefore, |x| - |y| ≤ |x - y|.

2. When x < y: In this case, |x - y| = -(x - y) = y - x. Also, |x| - |y| = -(x) - (-y) = -x + y. Since x < y, it follows that y - x ≤ -x + y. Therefore, |x| - |y| ≤ |x - y|.

In both cases, we have shown that |x| - |y| ≤ |x - y| holds true for all x and y in the real numbers.

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Yes, it is advantageous to switch from door #1 to door #2. The conditional probability that the car is behind door #2 given the relevant information that Monty opened door #3 and revealed a goat is 2/3.

Here's how to arrive at this solution:

First, let's define the events: C1, C2, and C3 are the events that the car is behind door #1, #2, or #3, respectively; A2 and A3 are the events that Monty opens door #2 or #3, respectively.

Let's assume that the contestant chooses door #1, and the car is behind door #2, so C2 is true.

Then Monty is forced to open door #3, revealing a goat. The probability of this happening is P(A3|C2) = 1. Since Monty cannot open the door with the car behind it, he is forced to open the door with the goat behind it, so

P(A2|C2) = 0.

Therefore, by Bayes' theorem,

P(C2|A3) = [P(A3|C2)P(C2)] / [P(A3|C1)P(C1) + P(A3|C2)P(C2) + P(A3|C3)P(C3)]

= (1 * 1/3) / (1/2 * 1/3 + 1 * 1/3 + 0 * 1/3)

= 2/3

So, the conditional probability that the car is behind door #2 given the information that Monty opens door #3 and reveals a goat is 2/3. Therefore, it is advantageous to switch from door #1 to door #2.

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Given Cristina's probability of getting a strike when bowling is 34 % for each frame (or turn).a) The probability of getting exactly two strikes in three consecutive frames The probability of getting exactly two strikes in three consecutive frames can be calculated using the binomial distribution. Therefore, the probability of getting exactly two strikes in three consecutive frames is 0.2281 or 22.81%.

The binomial distribution gives the probability of k successes in n trials, where each trial has a probability p of success. Here, we want to find the probability of exactly two strikes in three consecutive frames. This means we have three trials, and each trial has a probability of 0.34 (Cristina's probability of getting a strike) of success.

Thus, using the binomial distribution, the probability of getting exactly two strikes in three consecutive frames is:P(X = 2) = (3C2)(0.34)²(1-0.34)¹= 3 × 0.1156 × 0.66= 0.2281 or 22.81%.

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P{sum is at least 5 | first die is 2} = 2/4 = 0.5, The probability of finding the sum to be at least 5 is 0.5, the probability of finding that the first die is 2 is 0.25, and the probability of finding the sum to be at least 5 when the first die is 2 is 0.5.

Two 4-sided dice with the numbers 1 through 4 on each die have been rolled. The probability of finding the sum to be at least 5, finding that the first die is 2, and finding the sum to be at least 5 when the first die is 2 have to be calculated.

Step 1: Find the total number of possible outcomes. Two dice with 4 sides each can have (4 x 4) = 16 possible outcomes.

Step 2: Find the number of outcomes in which the sum is at least 5. We must first list the possible outcomes that meet the criterion of sum being at least 5: (1, 4), (2, 3), (3, 2), (4, 1), (2, 4), (3, 3), (4, 2), and (4, 3)

So, there are 8 outcomes in which the sum is at least 5.

Therefore, P{sum is at least 5} = 8/16 = 0.5

Step 3: Find the number of outcomes in which the first die is 2.

Since each die has 4 sides, there are 4 possible outcomes for the first die to be 2. Hence, the number of outcomes in which the first die is 2 is 4.

Therefore, P{first die is 2} = 4/16 = 0.25

Step 4: Find the number of outcomes in which the sum is at least 5 when the first die is 2.There are only two outcomes where the first die is 2 and the sum is at least 5, namely (2, 3) and (2, 4).

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0 items in this array will be found if they are searched.

The correct option is D.

If you perform a binary search on a 5-element array sorted in reverse order, none of the items in the array will be found.

This is because the binary search algorithm relies on the array being sorted in ascending order for its correct functioning.

When the array is sorted in reverse order, the algorithm will not be able to locate any elements.

Thus, 0 items in this array will be found if they are searched for.

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The solution to the problem is as follows: Let x be the number. "Two-fifths of one less than the number" is (2/5)(x-1), and "three-fifths of one more than that number" is (3/5)(x+1). To find x, solve the inequality (2/5)(x-1) < (3/5)(x+1), which yields x > -5.The correct answer is option B.

To solve the problem, let's break it down step by step:
1. Let's assume the number is represented by the variable x.
2. "Two-fifths of one less than a number" can be expressed as (2/5)(x-1).
3. "Three-fifths of one more than that number" can be expressed as (3/5)(x+1).
4. According to the problem, (2/5)(x-1) is less than (3/5)(x+1).
5. To solve this inequality, we can multiply both sides by 5 to get rid of the fractions: 5 * (2/5)(x-1) < 5 * (3/5)(x+1).
6. Simplifying the inequality, we have 2(x-1) < 3(x+1).
7. Expanding and simplifying further, we get 2x - 2 < 3x + 3.
8. Subtracting 2x from both sides, we have -2 < x + 3.
9. Subtracting 3 from both sides, we have -5 < x.
10. This inequality can be written as x > -5.
Therefore, the solution set for this problem is x greater than -5.
Answer: b) x greater-than negative 5.

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The purpose of the example of Sameer Bhatia finding a bone marrow donor through social networking is to illustrate the power and usefulness of social media in connecting people and facilitating important and life-saving actions.

By sharing his story on social media platforms, Bhatia was able to find a suitable donor and receive the necessary bone marrow transplant.

This example shows how social networking can be used for more than just entertainment and communication, but also for important and impactful purposes.

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a)

The value of the term deposit after 4.5 years is $68,950.53.

Calculation of the value of the term deposit after 4.5 years:
The compound interest formula is: $A=P(1+r)^n

Where:

P is the initial amount

r is the interest rate per compounding period,

n is the number of compounding periods

A is the final amount.

Given:

P=$45000,

r=8.8% per annum, and

n = 4.5 years (annually compounded).

Now substituting the given values in the formula we get,

A=P(1+r)^n

A=45000(1+0.088)^{4.5}

A=45000(1.088)^{4.5}

A=45000(1.532234)

A=68,950.53

Therefore, the value of the term deposit after 4.5 years is $68,950.53.

b)

The interest earned is $23950.53

Interest is the difference between the final amount and the initial amount. The initial amount is $45000 and the final amount is $68,950.53.

Thus, Interest earned = final amount - initial amount

Interest earned = $68,950.53 - $45000

Interest earned = $23950.53

Therefore, the interest earned is $23950.53.

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complete question:

The compound interest formula is given by A=P(1+r)^n where P is the initial amount, r is the interest rate per compounding period, n is the number of compounding periods, and A is the final amount. Suppose that $45000 is invested into a term deposit that earns 8.8% per annum. (a) Calculate the value of the term deposit after 4.5 years. (b) How much interest was earned?

The property of XOR for n = 2 states that if Y is a random variable over {0,1}^2 and X is an independent uniform random variable over {0,1}^2, then Z = Y⨁X is a uniform random variable over {0,1}^2.

To prove the property, we need to show that the XOR operation between Y and X, denoted as Z = Y⨁X, results in a uniform random variable over {0,1}^2.

To demonstrate this, we can calculate the probabilities of all possible outcomes for Z and show that each outcome has an equal probability of occurrence.

Let's consider all possible values for Y and X:

Y = (0,0), (0,1), (1,0), (1,1)

X = (0,0), (0,1), (1,0), (1,1)

Now, let's calculate the XOR of Y and X for each combination:

Z = (0,0)⨁(0,0) = (0,0)

Z = (0,0)⨁(0,1) = (0,1)

Z = (0,0)⨁(1,0) = (1,0)

Z = (0,0)⨁(1,1) = (1,1)

Z = (0,1)⨁(0,0) = (0,1)

Z = (0,1)⨁(0,1) = (0,0)

Z = (0,1)⨁(1,0) = (1,1)

Z = (0,1)⨁(1,1) = (1,0)

Z = (1,0)⨁(0,0) = (1,0)

Z = (1,0)⨁(0,1) = (1,1)

Z = (1,0)⨁(1,0) = (0,0)

Z = (1,0)⨁(1,1) = (0,1)

Z = (1,1)⨁(0,0) = (1,1)

Z = (1,1)⨁(0,1) = (1,0)

Z = (1,1)⨁(1,0) = (0,1)

Z = (1,1)⨁(1,1) = (0,0)

From the calculations, we can see that each possible outcome for Z occurs with equal probability, i.e., 1/4. Therefore, Z is a uniform random variable over {0,1}^2.

The property of XOR for n = 2 states that if Y is a random variable over {0,1}^2 and X is an independent uniform random variable over {0,1}^2, then Z = Y⨁X is a uniform random variable over {0,1}^2. This is demonstrated by showing that all possible outcomes for Z have an equal probability of occurrence, 1/4.

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We use J to represent Juile's original height, giving:

J + 19 = 65

This equation represents the relationship between Juile's original height and her height after the increase.

The sentence "Juile's height increased by 19 is 65" can be translated into an equation by breaking it down into two parts:

Juile's height increased by 19: This means that you can take Juile's original height and add 19 to it to get the new height after the increase.

The new height after the increase is 65: This means that the new height after the increase is equal to 65.

Combining these two parts, we get:

Juile's original height + 19 = 65

We use J to represent Juile's original height, giving:

J + 19 = 65

This equation represents the relationship between Juile's original height and her height after the increase.

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In sale time at a certain clothing store, if  all dresses are on sale for $5 less than 80% of the original price, then a function g that finds 80% of x, g(x)= 0.8x

To find the function g, follow these steps:

Therefore, the required function that finds 80% of x by first rewriting 80% as a decimal is g(x) = 0.8x.

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We have proved that if a^k ∈ H and gcd(n, k) = 1, then a ∈ H. To prove that a ∈ H, we need to show that a is an element of the subgroup H, given that H ≤ G and a has finite order n.

Let's start by using the given information:

Since a has finite order n, it means that a^n = e (the identity element of G).

Now, let's assume that a^k ∈ H, where k is a positive integer, and gcd(n, k) = 1 (which means that n and k are relatively prime).

By Bézout's identity, since gcd(n, k) = 1, there exist integers m and h such that mn + hk = 1.

Now, let's consider the element a^mn+hk:

a^mn+hk = (a^n)^m * a^hk

Since a^n = e, this simplifies to:

a^mn+hk = e^m * a^hk = a^hk

Since a^k ∈ H and H is a subgroup, a^hk must also be in H.

Therefore, we have shown that a^hk ∈ H, where mn + hk = 1 and gcd(n, k) = 1.

Now, since H is a subgroup and a^hk ∈ H, it follows that a ∈ H.

Hence, we have proved that if a^k ∈ H and gcd(n, k) = 1, then a ∈ H.

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The language L={w|w is in {a,b,c,d}∗, with the number of a′s = number of b's and the number of c's = the number of d's} is not context-free.

To prove that L is not context-free, we can use the pumping lemma for context-free languages. Consider the string w = anbncndn, where n is the pumping length. By applying the pumping lemma, we can divide w into uvxyz such that uv2xy2z ∈ L, where |vxy| ≤ n and |vy| ≥ 1. We analyze the possible positions of vxy in w:

1. If vxy consists only of a's or b's, pumping up v and y will result in unequal numbers of a's and b's, violating the conditions of L.

2. If vxy consists of both a's and b's, pumping up v and y will result in unequal numbers of a's and b's.

3. If vxy consists only of b's or c's, pumping up v and y will result in unequal numbers of a's and b's or c's and d's, respectively.

In all cases, we obtain strings that do not satisfy the conditions of L. Therefore, L is not a context-free language.

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To determine the value of c, we need to find the constant that makes the joint PDF integrate to 1 over its defined region.

The given joint PDF is (x,y) = cxy for 0 < x < 2 and 0 < y < 3.

a) To find the value of c, we integrate the joint PDF over the given region and set it equal to 1:

∫∫(x,y) dxdy = 1

∫∫cxy dxdy = 1

∫[0 to 2] ∫[0 to 3] cxy dxdy = 1

c ∫[0 to 2] [∫[0 to 3] xy dy] dx = 1

c ∫[0 to 2] [x * (y^2/2)] | [0 to 3] dx = 1

c ∫[0 to 2] (3x^3/2) dx = 1

c [(3/8) * x^4] | [0 to 2] = 1

c [(3/8) * 2^4] - [(3/8) * 0^4] = 1

c (3/8) * 16 = 1

c * (3/2) = 1

c = 2/3

Therefore, the value of c is 2/3.

b) To find the covariance and correlation, we need to find the marginal distributions of x and y first.

Marginal distribution of x:

fX(x) = ∫f(x,y) dy

fX(x) = ∫(2/3)xy dy

    = (2/3) * [(xy^2/2)] | [0 to 3]

    = (2/3) * (3x/2)

    = 2x/2

    = x

Therefore, the marginal distribution of x is fX(x) = x for 0 < x < 2.

Marginal distribution of y:

fY(y) = ∫f(x,y) dx

fY(y) = ∫(2/3)xy dx

    = (2/3) * [(x^2y/2)] | [0 to 2]

    = (2/3) * (2^2y/2)

    = (2/3) * 2^2y

    = (4/3) * y

Therefore, the marginal distribution of y is fY(y) = (4/3) * y for 0 < y < 3.

Now, we can calculate the covariance and correlation using the marginal distributions:

Covariance:

Cov(X, Y) = E[(X - E(X))(Y - E(Y))]

E(X) = ∫xfX(x) dx

     = ∫x * x dx

     = ∫x^2 dx

     = (x^3/3) | [0 to 2]

     = (2^3/3) - (0^3/3)

     = 8/3

E(Y) = ∫yfY(y) dy

     = ∫y * (4/3)y dy

     = (4/3) * (y^3/3) | [0 to 3]

     = (4/3) * (3^3/3) - (4/3) * (0^3/3)

     = 4 * 3^2

     = 36

Cov(X, Y) =

E[(X - E(X))(Y - E(Y))]

         = E[(X - 8/3)(Y - 36)]

Covariance is calculated as the double integral of (X - 8/3)(Y - 36) times the joint PDF over the defined region.

Correlation:

Correlation coefficient (ρ) = Cov(X, Y) / (σX * σY)

σX = sqrt(Var(X))

Var(X) = E[(X - E(X))^2]

Var(X) = E[(X - 8/3)^2]

      = ∫[(x - 8/3)^2] * fX(x) dx

      = ∫[(x - 8/3)^2] * x dx

      = ∫[(x^3 - (16/3)x^2 + (64/9)x - (64/9))] dx

      = (x^4/4 - (16/3)x^3/3 + (64/9)x^2/2 - (64/9)x) | [0 to 2]

      = (2^4/4 - (16/3)2^3/3 + (64/9)2^2/2 - (64/9)2) - (0^4/4 - (16/3)0^3/3 + (64/9)0^2/2 - (64/9)0)

      = (16/4 - (16/3)8/3 + (64/9)4/2 - (64/9)2) - 0

      = 4 - (128/9) + (128/9) - (128/9)

      = 4 - (128/9) + (128/9) - (128/9)

      = 4 - (128/9) + (128/9) - (128/9)

      = 4

σX = sqrt(Var(X)) = sqrt(4) = 2

Similarly, we can calculate Var(Y) and σY to find the standard deviation of Y.

Finally, the correlation coefficient is:

ρ = Cov(X, Y) / (σX * σY)

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