MATHEMATICS HIGH SCHOOL

Write cos 29° in terms of sine.
Help pls :(

Answers

Answer 1
Answer:

Answer:

0.48480962

Step-by-step explanation:

1. Take the sine of  29 ° .

sin ( 29 ° )

2. Evaluate  sin ( 29 ° ) .

0.48480962

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PLEZ HURRY I NEED HELPPPPPP WILL GIVE BRAINLYST
Which quadratic function has one real solution?A.0 = 2(x + 7)(x – 5) B.0 = (x – 3)(x – 3) C.0 = 2.4(x – 2)(x + 2) D.0 = (x – 2)(x – 1)
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Is the number rational or irrational?Column A Column B 1. 3/7 A. Rational 2. 0.78( repeating) B. Irrational 3. Square root 7/9 4. 5 pi

Find the perimeter of a regular octagon if one side has a measure of 8 cm. A. 16 cm. B. 64 cm. C. 56 cm. D. 72 cm.

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The answer is B. 64 cm

If I score 13 out of 24 in a test , what percentage is this ?

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13/24 would be 54% which is a D- (a fail)
the answer is 54% that is a fail.

Rob Polanski is a tractor salesman. Last week his total sales amounted to $38,642.00, and he received $2,704.94 in commission. What is his rate of commission?

Answers

We have to calculate the rate of commission of the total sales amount. We know that the total sales amount is $38,642.00 and it represents 100%. A salesman received $2,704.94 in commission and it represents x%. The proportion is: 38,624.00 : 2,704.94 = 100 : x; 38,624.00 x = 270,794 ; x = 270,794 : 38,624; x = 7% . Answer: His rate of commission is .07 or 7%.

How many degrees of a full circle can you travel eastward or westward from the zero (prime) meridian before heading back toward that Prime Meridian?

Answers

Answer:

The Prime Meridian is a line of longitude designated as 0 degrees, and it runs through Greenwich, London. When traveling eastward or westward from the Prime Meridian, you can travel up to 180 degrees in either direction before heading back toward the Prime Meridian.

So, you can travel a maximum of 180 degrees eastward or 180 degrees westward from the Prime Meridian before changing direction and heading back toward it. Beyond 180 degrees, you would start approaching the Prime Meridian from the opposite direction.

Final answer:

You can travel 180 degrees eastward or westward from the prime meridian before you start heading back towards it. This is primarily due to the arrangement of longitude and the physical structure of the earth.

Explanation:

If you travel eastward or westward from the zero (prime) meridian, the maximum degree that one can travel in either direction, assuming from the zero meridian, prior to heading back is 180 degrees. This is primarily due to the spherical structure of the earth and the way longitude is arranged.

This is defined as the International Date Line and lies exactly opposite the Prime Meridian, creating a semi-circular line. The Prime Meridian, by international agreement, is set at 0° and runs through Greenwich, England. This serves as a starting point for the measurement of longitude.

As you travel in either direction, the degree of longitude increases until you hit the International Date Line at 180°. Beyond the 180° mark, the degree starts decreasing heading back towards the Prime Meridian. Geography and astronomy recognise and adhere to these conventions.

Learn more about Prime Meridian here:

brainly.com/question/35826682

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What is 238,854 rounded to the nearest hundred

Answers

238,854 rounded to the nearest hundred is 238,900~

What is the first step in writing f(x) = 3x2 + 6x – 8 in vertex form?A. Factor out 3 from each term.


B. Form a perfect square trinomial by keeping the value of the function equivalent.


C. Write the trinomial as a binomial squared.


D. Factor out 3 from the first two terms.


Explain your answer?


No spam answers, if you spam your answers it's going mark your answer report.


If your answer is wrong that's going mark your answer report.


Thank you!



-Charlie

Answers

Answer:

  D. Factor out 3 from the first two terms.

Step-by-step explanation:

Vertex form is ...

  y = a(x -h)² +k

where (h, k) is the vertex and "a" is the vertical scale factor.

This equation expands to give ...

  y = ax² -2ahx + ah² +k

Factoring "a" from the terms involving x makes it easy to identify h and so finish putting the equation into vertex form. In this equation, that means the most appropriate first step is ...

  factor out 3 from the first two terms

Answer:

D. Factor out 3 from the first two terms.

Step-by-step explanation:

According to the VertexFormula[y = A(X - H)² + K], -H gives you the OPPOSITE terms of what they really are, but in this case, this would not qualify, since the question is asking something totally unique. So, since 3 is your "A", you factor that out, and since 6 is a multiple of 3, it is easy to work with. Anyway, you get this:

y = 3(x + 1)² - 11

I hope this helps you out alot, and as always, I am joyous to assist anyone at any time.
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