If sin θ = 2 over 7 and tan θ > 0, what is the value of cos θ?

Answer:

The correct answer is 0.123 cm.

Step-by-step explanation:

Each kilometer has 1000 meters and each meter has 100 centimeters.

Hence each kilometer has 1000×100=100000=105 centimeters.

Therefore, 1.23×10−6 kilometer will have

1.23×10−6×105=1.23×10−6+5=1.23×10−1 or 0.123 centimeters

The time it takes for a ball thrown downwards at a velocity of 21 ft/s from a height of 255 ft to reach the ground is approximately 4.05 seconds.

The physics problem presented is a classic example of a vertically descending projectile. Here, we can use the formula of motion to find the solution. The formula is h = vt + 0.5gt², where v is the initial velocity, g is the acceleration due to gravity, and h is the height.

Since the ball is thrown downwards, the initial velocity will be negative, -21 ft/s. We're also working in feet, so the gravitational acceleration should be in feet/s², which is approximately -32.2 ft/s² (remember it's negative as it's acting downwards).

So, substituting the values into the equation, we have 255 = (-21*t) + 0.5*(-32.2)*t². Simplifying this gives us a quadratic equation: 16.1t² - 21t - 255 = 0.

The roots of this equation represent the times at which the ball will be 255 ft below its starting point. We solve the equation and get t ≈ -3.9s or t ≈ 4.05s. Clearly, time cannot be negative, so the ball hits the ground after approximately 4.05 seconds from being thrown.

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The ball thrown from a height with initial downward velocity hits the ground after 3.79 seconds. This was found by solving the quadratic equation that stems from principles of physical motion (height vs time).

The problem can be solved using the principles of kinematics in physics. The height of the ball after t seconds is given by the equation of motion, which is a quadratic equation. If we let h be 0 (height when the ball hits the ground), we can solve the equation for t.

Given: initial height = 255 feet, initial velocity = 21 feet/s, acceleration due to gravity = 32.2 ft/s² (downward); The equation of motion is: h = 255 + 21t - 16t²; We have to find the time when the ball hits the ground i.e when h=0. So, the equation becomes: 0 = 255+21t-16t².

On solving this quadratic equation, we get two roots. Assuming upward direction is positive, the negative time value reflects the time before the ball was launched and the positive value is the time it takes for the ball to hit the ground. The positive root gives us the answer, t = 3.79 s.

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Tim's gross pay per pay period is $999.96. His hourly rate is approximately $12.82. This was calculated by dividing his annual salary by the number of pay periods and dividing his pay per period by the number of work hours per period respectively.

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3x+9-7x=2(x+6)

3x-7x = -4x

-4x+9 =2x+12

9=6x+12

-3 = 6x

x=-3/6 = - 1/2

x = - 1/2

The percentage of the scores are between 75.8 and 89 can be calculated using z-scores.

The percentage of the scores between 75.8 and 89 is 95%.

Given:

The mean is [tex]m=82.4[/tex].

The standard deviation is [tex]\sigma =3.3[/tex].

Calculate the Z- score for 75.8.

[tex]Z(75.8)=\dfrac{(75.8-82.4)}{3.3} \\Z(75.8) = -2[/tex]

Calculate the Z- score for 89.

[tex]Z(89)=\dfrac{(89-82.4)}{3.3}\\Z(89)=2[/tex]

Calculate the percentage of the scores are between 75.8 and 89.

[tex]P(75.8<X<89)=P(-2<Z<2)\\P(75.8<X<89)=P(Z<2)-P(Z<-2)\\[/tex]

Refer the z-table, put the value,

[tex]P(75.8<X<89)=0.9772-0.0227\\P(75.8<X<89)=0.9545[/tex]

Thus, the percentage of the scores between 75.8 and 89 is 95%.

Learn more about z-score here:

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Answer:   6

Step-by-step explanation:

Given : Tina is placing 30 roses and 42 tulips in vase for table decorations in her restaurant .

Each vase will hold the same number of flowers and each vase will have only one type of flower .

Then, the greatest number of flowers she can place it each vase will be the greatest common factor of 30 and 42.

Prime factorization of 30 and 42 :

[tex]30=2\times3\times5\\\\42=2\times3\times7[/tex]

We can see that greatest common factor of 30 and 42 = [tex]2\times3=6[/tex]

Hence, the greatest number of flowers she can place it each vase  =6

Answer:

The height of the telephone pole is 14.711 m (Approx) .

Step-by-step explanation:

Let us assume that the height be x .

Let us assume that the shadow  be y .

(As the shadow is always proportional to the height .)

Thus

[tex]x\propto y[/tex]

y = kx

Where k is the constant of proportionality .

As given

if a statue that is 33 cm tall cast a shadow 83 cm long .

y = 83 cm

x = 33 cm

Put in the equation y = kx .

83 = 33k

[tex]k = \frac{83}{33}[/tex]

As given

A telephone pole cast a shadow that is 37 m .

Let us assume that the height of the telephone pole be z .

As

1m = 100cm

37m = 3700 cm

y = 3700 cm

x = z

Put in the equation  y = kx .

3700 = zk

[tex]k = \frac{3700}{z}[/tex]

Compare the value of k .

[tex]\frac{3700}{z} = \frac{83}{33}[/tex]

[tex]\frac{3700\times 33}{83} =z[/tex]

[tex]\frac{122100}{83} =z[/tex]

z = 1471.1 cm(Approx)

As

[tex]1\ cm = \frac{1}{100}\ m[/tex]

[tex]1471.1\ cm = \frac{1471.1}{100}\ m[/tex]

                       = 14.711 m (Approx)

Therefore the  height of the telephone pole is 14.711 m (Approx) .

To evaluate the solid e which lies between two cylinders and a plane, one would typically set up a triple integral in cylindrical coordinates. This involves translating the given boundaries from rectangular coordinates into cylindrical coordinates to account for the radial, angular, and vertical dimensions of the solid.

This question pertains to the evaluation of a solid, denoted as e, that is located between the two cylinders x^2 + y^2 = 1 and x^2 + y^2 = 16. These cylinders are located above the xy-plane and below the plane z = y + 4. The evaluation of such a solid requires the application of integral calculus. Typically, in such cases we would set up a triple integral by converting rectangular coordinates into cylindrical coordinates (r, theta, z).

Given the specifics of the solid, the radial path r would vary between sqrt(1) and sqrt(16), which is between 1 and 4. The angular path theta would cover the full circle, thus varying between 0 and 2π. The z-coordinate would be bounded below by the xy-plane (0) and above by the plane z = y + 4.  Please note that you would need to convert the z-boundary into cylindrical coordinates as well.

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Answer:

x= -5

Step-by-step explanation:

You bought [tex]\( \frac{25}{104} \)[/tex]of a pound of ham, which is approximately 0.2404 pounds.

To find the fraction of a pound you bought, divide the total weight by the price per pound.

Given:

Total weight = 1.25 pounds

Price per pound = $5.20

[tex]\[ \text{Fraction of a pound} = \frac{\text{Total weight}}{\text{Price per pound}} \]\[ \text{Fraction of a pound} = \frac{1.25}{5.20} \]\[ \text{Fraction of a pound} \approx \frac{125}{520} \][/tex]

Now, simplify the fraction:

[tex]\[ \text{Fraction of a pound} \approx \frac{25 \times 5}{104 \times 5} \]\[ \text{Fraction of a pound} = \frac{25}{104} \][/tex]

So, you bought [tex]\( \frac{25}{104} \)[/tex] of a pound of ham.

The equation for the height of a football punted with initial conditions is calculated, and the time the football spent in the air is determined.

Given: Initial height = 2.5 feet

Initial vertical velocity = 45 ft/s

The height at which the ball is caught = is 5.5 feet

Equation to model height: h(t) = -16t² + 45t + 2.5 where h(t) is the height at time t seconds.

Time in the air: To find how long the ball is in the air, solve for t when h(t) = 5.5 feet.

Final answer: The football was in the air for approximately 1.9 seconds.

The area of the parallelogram is calculated by multiplying the base (45 cm) and the height (29 cm), giving us a total area of 1305 cm².

The area of a parallelogram is the product of the base and height.

The base is the longer side of the parallelogram, which is 33cm +12cm = 45cm.

And, the height would be the shorter side, which is 29cm.

Therefore, the area of the parallelogram can be calculated with the

formula base x height = 45cm x 29cm = 1305 cm².

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Answer:

$145/10 = $14.50

$14.50 * 8 = $116.00

Step-by-step explanation:

Answer:

20.99 years . plato

Step-by-step explanation:

Answer:

The transfer rate of USB is 200 times the transfer rate of Modem

Step-by-step explanation:

Jayla has a USB stick that transfers data at 2.4 x 10^9 bytes per second. Her modem transfers data at 1.2 x 10^7 bytes per second.

To compare the transfer rate we divide the transfer rate of USB by modem

[tex]\frac{2.4*10^9}{1.2*10^7}[/tex]

2.4 divide by 1.2 is 2

10^9 divide by 10^7 = 10^2

So its 2* 10^2 = 200

The transfer rate of USB is 200 times the transfer rate of Modem

The USB stick transfers data at a rate which is significantly faster than the modem.

The statement that is true is that Jayla's USB stick transfers data much faster than her modem. This is because the data transfer rate of the USB stick, which is 2.4 x 109 bytes per second, is greater than the modem's transfer rate of 1.2 x 107 bytes per second. We can compare the two rates directly because they are given in the same units. We can see that the USB's speed is two decimal places further to the right than the modem's speed, meaning it is 100 times faster.

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Final answer:

The point estimate of the true proportion of all lightbulbs that last more than 500 hours is approximately 0.634, calculated using the sample data of 291 out of 459 lightbulbs lasting more than 500 hours.

Explanation:

To find a point estimate of the true proportion of all lightbulbs that last more than 500 hours, we use the sample data provided. Out of 459 randomly selected lightbulbs, 291 lasted more than 500 hours.

The point estimate is calculated by dividing the number of successes in the sample by the total number of trials. In this case, the point estimate (p-hat) would be 291 divided by 459, which gives us an estimate of the true proportion.

The calculation would be as follows:

The point estimate for the true proportion of all lightbulbs that last more than 500 hours is approximately 0.634.

The probability of spinning 2 then 4: [tex]\( \frac{1}{10} \times \frac{1}{10} = \frac{1}{100} \).[/tex]

To find the probability that the first spin results in a 2 and the second spin results in a 4, we need to determine the probability of each event and then multiply them together because the spins are independent.

1. Probability of spinning a 2 on the first spin:

  Since there is 1 section labeled '2' out of 10 sections in total, the probability of spinning a 2 on the first spin is [tex]\( \frac{1}{10} \)[/tex].

2. Probability of spinning a 4 on the second spin:

  Similarly, there is 1 section labeled '4' out of 10 sections in total, so the probability of spinning a 4 on the second spin is also [tex]\( \frac{1}{10} \)[/tex].

Now, to find the probability of both events happening (the first spin resulting in a 2 and the second spin resulting in a 4), we multiply the probabilities of each event:

[tex]\[ P(\text{first spin = 2}) \times P(\text{second spin = 4}) \][/tex]

[tex]\[ = \frac{1}{10} \times \frac{1}{10} \][/tex]

[tex]\[ = \frac{1}{100} \][/tex]

So, the probability that the first spin results in a 2 and the second spin results in a 4 is [tex]\( \frac{1}{100} \)[/tex].