Pls help asap this is due tomorrow

The length of one leg of a right triangle is 8 centimeters shorter than the hypotenuse. The hypotenuse is 42 centimeters. What is the length of the unknown leg of the right triangle?

The length of the unknown leg is __ approximately centimeters.

(Write an integer or a decimal number rounded to the nearest ten when necessary.)

Answer:

772.035cm^2

Step-by-step explanation:

To calculate the surface area of an isosceles triangle, we need the lengths of the base and the two equal sides. The formula to calculate the area of an isosceles triangle is given by:

Area = (1/4) * √(4a^2 - b^2) * b

where 'a' represents the length of the equal sides and 'b' represents the length of the base.

Given:

Base (b) = 45 cm

Equal side length (a) = 41 cm

Using the formula, we can calculate the surface area:

Area = (1/4) * √(4 * 41^2 - 45^2) * 45

Area = (1/4) * √(4 * 1681 - 2025) * 45

Area = (1/4) * √(6724 - 2025) * 45

Area = (1/4) * √(4699) * 45

Area ≈ (1/4) * 68.5812 * 45

Area ≈ 17.1453 * 45

Area ≈ 772.035 cm²

Therefore, the surface area of the isosceles triangle is approximately 772.035 cm².

Answer:

y = 1

Step-by-step explanation:

Chlorine has two stable isotopes , Cl-35 and Cl-37 with atomic masses 34.968 u and 36.956 u respectively. If the average atomic mass is 35.453 u.

Answer:

y = 1

Step-by-step explanation:

Plug in 1 for x

[tex]\bf{y=\dfrac{1}{3}\times3^1}[/tex]

Simplify

[tex]\bf{y=\dfrac{1}{3}\times3}[/tex]

Multiply

[tex]\bf{y=\dfrac{1}{3}\times\dfrac{3}{1}}[/tex]

Simplify

[tex]\bf{y=1}[/tex]

Hence, y = 1

The expression for his total earnings can be derived by multiplying the number of tutoring hours by the tutoring rate and adding it to the product of the number of waiter hours and the waiter rate.

Let's assume the hourly rate for Ravi's tutoring job is "t" dollars and the hourly rate for his waiter job is "w" dollars.

Since Ravi worked as a tutor for "x" hours this month, he earned a total of x * t dollars from his tutoring job.

Similarly, as he worked as a waiter for 1 hour each day this month, he earned a total of 1 * w dollars from his waiter job.

To calculate the combined total dollar amount he earned this month, we can express it as x * t + 1 * w, which represents the earnings from his tutoring job plus the earnings from his waiter job.

This expression provides the total dollar amount Ravi earned based on the given hourly rates and the number of tutoring hours.

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The statement that is correct among the answer choices is: "If two graphs g and h have the same number of edges, then g and h must have the same total degree."

A diagram or pictorial representation that organises the depiction of facts or values is known as a graph. The relationships between two or more items are frequently represented by the points on a graph.

In graph theory, the total degree of a graph is the sum of the degrees of all its vertices. The degree of a vertex in a graph is the number of edges incident to that vertex. Therefore, the total degree represents the sum of all degrees in the graph.

If two graphs g and h have the same number of edges, it does not necessarily mean that they have the same degree sequence (the sequence of degrees of all vertices in the graph). However, it can be concluded that they must have the same total degree because the number of edges directly contributes to the sum of degrees in a graph.

Hence, the statement that correctly relates the number of edges and the total degree of two graphs is: "If two graphs g and h have the same number of edges, then g and h must have the same total degree."

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Answer:

15 +36+39=90

Step-by-step explanation:

15+36+39=90[right angle triangle]

Answer:

a4 = -10

Step-by-step explanation:

Our givens are:
[tex]a_1 = 10\\a_n = (-1)^n \cdot a_{n - 1} + 5[/tex]

Since we do not know the value of a3 to substitute as [tex]a_{n - 1}[/tex] to find a4, we'll find the terms prior to the fourth term by substituting their respective indices into the given formula, starting with n = 2 and incrementing by 1 each time.

[tex]a_1 = 10\\a_2 = (-1)^2 \cdot a_{2 - 1} + 5 = 1 \cdot a_1 + 5 = 10 + 5 = 15\\a_3 = (-1)^3 \cdot a_{3 - 1} + 5 = -1 \cdot a_2 + 5 = -15 + 5 = -10\\a_4 = (-1)^4 \cdot a_{4 - 1} + 5 = 1 \cdot a_3 + 5 = -10 + 5 = -5[/tex]

Therefore, a4 = -10.

The percentage of those students that had a drink also had a snack is 66%

from the question, we have the following parameters that can be used in our computation:

Drink and Snack = 35%

Drink = 53%

using the above as a guide, we have the following:

P(Snack given drink) = 35%/53%

Evaluate

P(Snack given drink) = 66%

Hence, the percentage is 66%

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The line integral of (x⁸y + sin(x)) dy along the arc of the parabola y = x² is equal to 1/9.

To evaluate this line integral, we need to parameterize the curve C, which is the arc of the parabola y = x². Let's choose the parameterization x = t and y = t², where t ranges from 0 to 1.

Now we can express dy in terms of dt: dy = (dy/dt) dt = (2t) dt.

Substituting this into the integrand, we have (x⁸y + sin(x)) dy = (t⁸(t²) + sin(t)) (2t) dt = 2t¹⁰ + 2tsin(t) dt.

The integral of 2t¹⁰ with respect to t is (2/11)t¹¹. The integral of 2tsin(t) with respect to t is -2tcos(t) - 2sin(t).

Evaluating these integrals from t = 0 to t = 1, we have

[tex]\[\left(\frac{2}{11}(1^{11}) - 2(1)\cos(1) - 2\sin(1)\right) - \left(\frac{2}{11}(0^{11}) - 2(0)\cos(0) - 2\sin(0)\right)\][/tex].

Simplifying further, we get  [tex]\(\frac{2}{11} - 2\cos(1) - 2\sin(1)\)[/tex].

This is approximately equal to 0.0893.

Hence, the line integral is approximately 0.0893, or equivalently, 1/9.

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The morbidity rate is 500 cases per 100,000 people.

The morbidity rate is a measure of the number of cases of a particular disease within a specific population. In this scenario, out of 100,000 individuals exposed to the bacterial pathogen, 500 individuals develop the disease. Therefore, the morbidity rate is calculated by dividing the number of cases (500) by the total population (100,000) and multiplying by 100,000 to express it per 100,000 people.

Morbidity rate = (Number of cases / Total population) x 100,000

In this case, the calculation would be:

Morbidity rate = (500 / 100,000) x 100,000 = 500 cases per 100,000 people.

This means that for every 100,000 individuals exposed to the bacterial pathogen, there are 500 cases of the disease. The morbidity rate provides an important measure of the impact and prevalence of a disease within a population, allowing for comparisons and assessments of public health.

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The 35% of the animals in the zoo are aquatic based on the stated fraction of animals.

Let us assume the number of aquatic animals to be x. We will solve the fraction. So, the expression representing each number will be -

⅖ + ¼ + x = 1

Taking LCM on Left Hand Side of the equation, we get 20

[tex] \frac{(2 \times 4) + (1 \times 5)}{20} + x = 1[/tex]

Performing multiplication in numerator on Left Hand Side and solving this fraction

[tex] \frac{8 + 5}{20} + x = 1[/tex]

[tex] \frac{13}{20} + x = 1[/tex]

Rearranging the equation in terms of x

x = [tex]1 - \frac{13}{20} [/tex]

[tex]x = \frac{20 - 13}{20} [/tex]

[tex]x = \frac{7}{20} [/tex]

The percentage of aquatic animals at the zoo will be given by the formula -

Percentage = number of aquatic animals/total animals × 100

Percentage =

[tex] \frac{ \frac{7}{20} }{1} \times 100[/tex]

Cancelling the possible numbers

Percentage = 7×5

Percentage = 35%

Hence, the aquatic animals in the zoo are 35%.

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The mean of the data is 41.7, the median is 41.9 and the mode of the data is 42.9.

Here,

We have,

In mathematics, the three main methods for indicating the average value of a set of integers are mean, median, and mode. Adding the numbers together and dividing the result by the total number of numbers in the list yields the arithmetic mean. An average is most frequently used to refer to this. The middle value in a list that is arranged from smallest to greatest is called the median. The value that appears the most frequently on the list is the mode.

The mean is given as:

mean = summation of the frequency / total frequency

mean = 3708/89 = 41.66

The median of the given data is the central value.

In the given data median is the mean of the ages between 56 and 57.

Median = 45 + (89/2) - 59 / 23  * (5)

Median = 41.9

The mode is given for the data having the highest frquency.

The highest frequency is observed at 40-----44:

Mode = 40 + (28 - 21) / (56 - 21 - 23) (5)

Mode = 42.9

Hence, the mean of the data is 41.7, the median is 41.9 and the mode of the data is 42.9.

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Group auditors are responsible for auditing the consolidated financial statements of a group of companies, while component auditors examine the financial statements of individual divisions, subsidiaries, or segments within the group.

Group auditors are appointed to audit the consolidated financial statements of a group of companies. These statements present the financial position, performance, and cash flows of the entire group as a whole. Group auditors are responsible for providing an opinion on the fairness and accuracy of these consolidated financial statements, considering the financial information of all the subsidiaries, divisions, and segments that make up the group.

Component auditors, on the other hand, are engaged to audit the financial statements of specific divisions, subsidiaries, or segments within the group. They examine the financial information and transactions pertaining to these specific components and provide their opinion on their individual financial statements.

When component auditors examine a division, subsidiary, or segment of group financial statements, several issues may arise. These include consistency in accounting policies and practices across different components, intercompany transactions and eliminations, consolidation adjustments, and communication and coordination between the group auditors and component auditors. Ensuring that the component auditors adhere to the same auditing standards, use consistent accounting policies, and provide accurate and reliable information is crucial for the group auditors to effectively consolidate the financial statements and present a true and fair view of the group's financial position and performance. Proper coordination and communication between the group auditors and component auditors are essential to address these issues and ensure the integrity and reliability of the consolidated financial statements.

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To find the probability that a randomly selected film is between 100 and 120 minutes long, we can use the properties of the normal distribution.

First, we calculate the z-scores for the lower and upper bounds of the desired range:

Lower z-score = (100 - 96) / 12 = 0.333

Upper z-score = (120 - 96) / 12 = 2.000

Next, we look up the probabilities associated with these z-scores in the standard normal distribution table. The probability for the lower bound is P(Z < 0.333) and the probability for the upper bound is P(Z < 2.000).

Using the table or a statistical calculator, we find that the probability for the lower bound is approximately 0.6293 and the probability for the upper bound is approximately 0.9772. To find the probability within the desired range, we subtract the lower probability from the upper probability:

P(100 < X < 120) = P(Z < 2.000) - P(Z < 0.333) = 0.9772 - 0.6293 = 0.3479

Therefore, the probability that a randomly selected film is between 100 and 120 minutes long is approximately 0.3479, or 34.79%.

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Answer:

If two chords intersect inside a circle, then the measure of the angle formed is one half the sum of the measure of the arcs intercepted by the angle and its vertical angle. In the circle, the two chords ¯PR and ¯QS intersect inside the circle. Since vertical angles are congruent, m∠1=m∠3 and m∠2=m∠4.

The demand for wheat bread is expected to be more price elastic compared to the demand for organic whole milk.

Price elasticity of demand measures the responsiveness of the quantity demanded to changes in price. When a product is more price elastic, it means that consumers are more sensitive to changes in price and the quantity demanded will change significantly in response to price changes. In this case, the statement suggests that the demand for wheat bread is more price elastic than the demand for organic whole milk.

There are several reasons why the demand for wheat bread may be more price elastic. Firstly, wheat bread may have more readily available substitutes in the market, such as other types of bread or bakery products. Consumers can easily switch to alternatives if the price of wheat bread increases, leading to a larger change in quantity demanded.

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The quadratic formula is a powerful tool for solving quadratic equations and predicting the nature of their solutions. It allows us to find the values of the variable that satisfy the equation and determine whether those solutions are real or complex.

The formula is derived from the standard form of a quadratic equation, ax² + bx + c = 0, where a, b, and c are constants. The quadratic formula states that the solutions for x can be found using the expression: x = (-b ± √(b² - 4ac)) / (2a). This formula provides a straightforward method for solving quadratic equations and determining the number and type of solutions.

To use the quadratic formula, we begin by identifying the coefficients a, b, and c from the quadratic equation. Then, we substitute these values into the quadratic formula and perform the necessary calculations. The discriminant, represented by the expression (b² - 4ac), plays a crucial role in predicting the nature of the solutions.

If the discriminant is positive, that is, (b² - 4ac) > 0, the equation has two distinct real solutions. If the discriminant is zero, (b² - 4ac) = 0, the equation has a single real solution, which is known as a "double root." On the other hand, if the discriminant is negative, (b² - 4ac) < 0, the equation has no real solutions, and the solutions will be complex numbers. In this case, the solutions will be in the form of a complex conjugate, x = (-b ± √(-1)(b² - 4ac)) / (2a), where the square root of the negative discriminant introduces the imaginary unit, "i."

By utilizing the quadratic formula and analyzing the discriminant, we can efficiently solve quadratic equations and determine the nature of their solutions, whether they are real or complex, and how many solutions exist. This approach provides a systematic and reliable method for working with quadratic equations in various mathematical and real-world contexts.

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Answer:

he is using at least 1,237 minutes a month

Step-by-step explanation:

15+0.06m ≥ 89.22

m ≥ 1,237

Sue can make 6 bracelets from a chain that is 49 1/2 inches long.

To determine the number of bracelets Sue can make from a chain that is 49 1/2 inches long, we divide the total length of the chain by the length required for each bracelet.

The length required for each bracelet is given as 8 1/4 inches. We can convert this mixed number to an improper fraction by multiplying the whole number (8) by the denominator (4) and adding the numerator (1), resulting in 33/4 inches.

To calculate the number of bracelets, we divide the total length of the chain (49 1/2 inches) by the length required for each bracelet (33/4 inches).

Using division of mixed numbers, we can convert the total length of the chain to an improper fraction by multiplying the whole number (49) by the denominator (2) and adding the numerator (1), resulting in 99/2 inches.

Now, we divide 99/2 by 33/4. To divide fractions, we multiply the dividend by the reciprocal of the divisor. Thus, 99/2 divided by 33/4 is equal to (99/2) * (4/33) = 6.

Therefore, Sue can make 6 bracelets from a chain that is 49 1/2 inches long.

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The value of Kearney's retirement savings when he retired at age 68 is approximately $351,115.71

To calculate the value of Kearney's retirement savings when he retired, we can use the formula for the future value of an ordinary annuity with monthly compounding of interest:

FV = P * [(1 + r)^n - 1] / r

Where:
FV is the future value of the annuity (retirement savings)
P is the monthly payment or investment amount ($200)
r is the monthly interest rate (5.5% / 12)
n is the number of compounding periods (number of months from age 30 to age 68, which is 68 - 30 = 38 years * 12 months/year = 456 months)

Let's calculate the value of Kearney's retirement savings:

r = 5.5% / 12 = 0.0045833 (monthly interest rate)
n = 456 (number of months)

FV = 200 * [(1 + 0.0045833)^456 - 1] / 0.0045833

Calculating the value:

FV ≈ $351,115.71

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The members of a club are making flags that each use 2/3 yard of fabric.

They have 5 1/3 yards of fabric. Therefore,total of 8 flags can be made.

Here, Divide the total yards of fabric available by the yards of fabric used per flag.

Given: Each flag uses 2/3 yards of fabric.

The total fabric the club has is 5 1/3.

5 1/3 = (5 * 3 + 1) / 3 = 16/3

Now, calculate the number of flags:

Number of flags = Total yards of fabric / Yards of fabric per flag

= (16/3) / (2/3)

= (16/3) * (3/2)

= 16/2

= 8

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The variable that is held constant in the experiment is the volume of distilled water used to dissolve each compound.

In this experiment, the student is investigating the conductivity of compounds A, B, and C. To ensure a fair comparison and isolate the effects of the compounds themselves, it is important to keep certain variables constant. The variable held constant in this experiment is the volume of distilled water used to dissolve each compound. By using the same volume (1000 mL) for all three compounds, the student ensures that any differences observed in conductivity can be attributed to the properties of the compounds rather than variations in the amount of solvent. This helps in obtaining reliable and accurate results. By controlling this variable, the student can effectively compare the conductivity of the different compounds and draw conclusions about their conductive properties.

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The probability that the body is attempting to reject the kidney when the new urine test has a positive result is 74.19%.

In about 30% of kidney transplants, the body tries to reject the organ. The new urine test is not perfect and it is known that 20% of people who do reject the transplant test negative, and 7% of people who do not reject the transplant test positive.

According to Baye’s theorem:

The probability that the body is attempting to reject the kidney when the new urine test has a positive result P(A) = P (Trying to reject | Positive test)

Now, we have to find P (Trying to reject | Positive test)

P(Trying to reject) = 30%

P(Not Trying to reject) = 70%

P(Positive test | Trying to reject) = 80%

P(Negative test | Trying to reject) = 20%

P(Positive test | Not trying to reject) = 7%

P(Negative test | Not trying to reject) = 93%

Let's calculate the probability of a positive result

P(Positive result) = P(Trying to reject) x P(Positive test | Trying to reject) + P(Not Trying to reject) x P(Positive test | Not trying to reject)

P(Positive result) = 0.3 × 0.8 + 0.7 × 0.07

P(Positive result) = 0.314

We can now calculate the probability that the body is attempting to reject the kidney when the new urine test has a positive result using Baye’s theorem.

P(Trying to reject | Positive test) = P(A) = P(Positive test | Trying to reject) x P(Trying to reject) / P(Positive result)

P(A) = 0.8 × 0.3 / 0.314P(A) = 0.7419 ≈ 74.19%

Therefore, the probability that the body is attempting to reject the kidney when the new urine test has a positive result is 74.19%.

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Answer:

Step-by-step explanation:

You can't simplify 32/23, the numerator and denominator don't have a common divisor, so you either divide 32 by 23 (32:23=1.391304347826087 which you can round to 1.4) or in mixed numbers 32/23=1 9/23

The formula to find the volume of a sphere is:

V = (4/3)πr^3

Substituting r = 3, we get:

V = (4/3)π(3^3) V = 113.1 cubic inches

To find the time it takes Sarah to inflate the balloon, we can use the formula:

time = volume / rate of inflation

Substituting the values we know, we get:

time = 113.1 / 200 time = 0.5655 minutes

Rounding to the nearest tenth, the time it takes Sarah to inflate the balloon is approximately 0.6 minutes.

The distribution function F(t) is F(t) = 3t/5 for 0 ≤ t ≤ 100/60. The density function f(t) is f(t) = 3/5 for 0 ≤ t ≤ 100/60.

Let X be the distance from the ambulance station to the accident location. Since accidents occur uniformly along the road, X follows a uniform distribution on the interval [0, 100]. The probability density function (pdf) of X is f(x) = 1/100 for 0 ≤ x ≤ 100.

The time it takes the ambulance to arrive at the scene, denoted by T, can be calculated as T = X/60, where the ambulance speed is 60 miles per hour.

F(t) = P(T ≤ t) = P(X/60 ≤ t) = P(X ≤ 60t) = ∫[0, 60t] f(x) dx

Since f(x) is a constant within the interval [0, 100], we can evaluate the integral as:

F(t) = ∫[0, 60t] f(x) dx = (60t - 0) * (1/100) = 3t/5

Therefore, the distribution function F(t) is given by F(t) = 3t/5 for 0 ≤ t ≤ 100/60.

To find the density function f(t), we can differentiate the distribution function F(t) with respect to t:

f(t) = dF(t)/dt = 3/5

Therefore, the density function f(t) is a constant 3/5 for 0 ≤ t ≤ 100/60.

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Answer:

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The goal was $5000 and raised amount was 175% of the goal.

Find the raised amount:

The purchase of a callable municipal revenue bond at a price of 120 with a 4.37% coupon and maturity of 18 years, followed by the issuer calling the bond at par two years later, is an example of an early redemption due to the issuer's exercise of the bond's call provision.

A callable bond gives the issuer the right to redeem the bond before its maturity date, typically at a predetermined price known as the call price or par value. In this case, the bond was purchased at a price of 120, which means the investor paid 120% of the bond's face value. The bond carries a 4.37% coupon rate, indicating the annual interest payment as a percentage of the bond's face value. After two years, the issuer exercises the call provision and redeems the bond at its par value, effectively ending the bond's term before the original maturity date. This early redemption provides the issuer with the opportunity to refinance the debt at potentially lower interest rates or for other financial reasons.

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The polynomial function[tex]g(x) = 3x^2 + 3x - 6[/tex] can be graphed to visualize its shape and behavior.

To find the polynomial function, let's start by expanding the given expression:

g(x) = 3(x+2)(x-1)

Using the distributive property, we can expand this expression as follows:

g(x) = 3(x)(x) + 3(x)(-1) + 3(2)(x) + 3(2)(-1)

Simplifying each term:

[tex]g(x) = 3x^2 - 3x + 6x - 6[/tex]

Combining like terms:

[tex]g(x) = 3x^2 + (6x - 3x) - 6\\g(x) = 3x^2 + 3x - 6[/tex]

Therefore, the polynomial function is g(x) =[tex]3x^2 + 3x - 6.[/tex]

This is a quadratic function, as it is a polynomial of degree 2. The highest power of x is 2, indicating a parabolic shape when graphed.

The coefficient of x^2 is 3, which determines the steepness of the parabola. A positive coefficient indicates an upward-opening parabola, while a negative coefficient would result in a downward-opening parabola.

The coefficient of x is 3, which represents the linear term of the function. It determines the slope or rate of change of the function.

The constant term is -6, which indicates the y-intercept, the point at which the graph intersects the y-axis.

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