Nora orders a bowl of Tom Yam soup at a restaurant which offers a 15% discount.

Two airplanes are flying to the same airport. Their positions are shown in the graph. Write a system of linear equations that re

zzz [12365]

To formulate the system, it's necessary to consider the slope of each line along with at least one point from each line. The two lines will connect each plane's location to their destination airport. It's important to note that the airport's coordinates represent the intersection of these two lines, corresponding to the solution of the system. First, the slope of the line from airplane one to the airport is: m = 2; this can be observed by plotting the two points. From airplane 1's location, the rise is 8 units while the run is 4 units to reach the airport, making the slope 8 divided by 4 = 2. We then insert the slope and point (2,4) into the point-slope form: y - 4 = 2(x - 4), which can be rearranged to standard form 2x - y = 0. For airplane two, the slope to the airport is obtained by observing the vertical decrease of 3 and a horizontal increase of 9 as we move from the airport to airplane 2. We then substitute the slope and the point (15,9) into the point-slope form: y - 9 = -1/3(x - 15), which can be rearranged to the standard form: x + 3y = 42. Consequently, the system of equations is: 2x - y = 0 and x + 3y = 42. Multiplying the first equation by 3 produces a system of: 6x - 3y = 0 and x + 3y = 42. Adding these equations results in the equation 7x = 42. Thus, x = 6, and by substituting this value back into 2x - y = 0, we determine y = 12. Thus, we demonstrate that the airport's coordinates do indeed comprise the solution to our system.

6 0

2 months ago

A 95% confidence interval for the population proportion of professional tennis players who earn more than 2 million dollars a ye

Svet_ta [12734]

Response:

e. 545

Detailed explanation:

In a survey sample containing n individuals, with a success probability of $\pi$ , and a confidence level of $1-\alpha$ , the ensuing confidence interval for proportions is established.

$\pi \pm z\sqrt{\frac{\pi(1-\pi)}{n}}$

Wherein

z denotes the z-score corresponding to a probability value of $1 - \frac{\alpha}{2}$ .

For this scenario, we find:

The estimate averages the two bounds. Thus $\pi = \frac{0.82+0.88}{2} = 0.85$

95% confidence level

Consequently, z represents the z value corresponding to the p-value of $1 - \frac{0.05}{2} = 0.975$ , hence $Z = 1.96$ .

The lower boundary of this interval is:

$L = \pi - z\sqrt{\frac{\pi(1-\pi)}{n}}$

In this query, L = 0.82. Therefore

$0.82 = 0.85 - 1.96\sqrt{\frac{0.85*0.15}{n}}$

$1.96\sqrt{\frac{0.85*0.15}{n}} = 0.03$

$0.03\sqrt{n} = 1.96\sqrt{0.85*0.15}$

$\sqrt{n} = \frac{1.96\sqrt{0.85*0.15}}{0.03}$

$(\sqrt{n})^{2} = (\frac{1.96\sqrt{0.85*0.15}}{0.03})^{2}$

$n = 544.23$

Thus, the accurate response is:

e. 545

4 0

1 month ago

7: Maribel blinks her eyes 105 times in 5 minutes. If b represents the number of times Maribel blinks in m minutes, what is a li

zzz [12365]

Answer:

Step-by-step explanation:

105 divided by 5 equals 21

21m=b

Please don't hesitate to reach out with any questions you may have.

3 0

3 months ago

Ann aumento 60% las cantidades de

Leona [12618]

Ella utilized 60% more than what was necessary, indicating she used (1 + 0.60) = 1.60 times the required amount. Man, I'm pleased to see you know some Spanish. Good luck, buddy!

4 0

2 months ago

Find the value of $x$ that maximizes $$f(x) = \log (-20x + 12\sqrt{x}).$$ If there is no maximum value, write "NONE".

zzz [12365]

The function can be expressed as:
f(x) = log(-20x + 12√x)
To ascertain the maximum value, differentiate the equation with respect to x and set the derivative to zero. The procedure unfolds as follows.

The differentiation formula is:
d(log u)/dx = du/u ln(10)
Thus,
d/dx = (-20 + 6/√x)/(-20x + 12√x)(ln 10) = 0
-20 + 6/√x = 0
6/√x = 20
From which we derive x = (6/20)² = 9/100

Therefore,
f(x) = log(-20(9/100)+ 12√(9/100)) = 0.2553

The function's maximum value is 0.2553.

5 0

3 months ago