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3 years ago

Write the recurring decimal 0.256 as a fraction in its simplest form.

Mathematics

1 answer:

In-s [12.5K]3 years ago

4 0

Answer:

32/152

Step-by-step explanation:

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Here is a list of ages (years) of children in a room:

dlinn [17]

Answer:

Step-by-step explanation:

median basically means the number which is in the middle so 8,8,9, 5 ,10,4,9

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2 years ago

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babymother [125]

Answer:

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Step-by-step explanation:

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3 years ago

Lola takes the train from Paris to Nice. The distance between the two cities is about 900,000 meters. If the train travels at a

Elanso [62]

Nice??? there is a city called nice? anyways, your answer is 5000. hope this helps :)

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3 years ago

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Show tan(???? − ????) = tan(????)−tan(????) / 1+tan(????) tan(????)<br> .

anyanavicka [17]

Answer:

See the proof below

Step-by-step explanation:

For this case we need to proof the following identity:

$tan(x-y) = \frac{tan(x) -tan(y)}{1+ tan(x) tan(y)}$

We need to begin with the definition of tangent:

$tan (x) =\frac{sin(x)}{cos(x)}$

So we can replace into our formula and we got:

$tan(x-y) = \frac{sin(x-y)}{cos(x-y)}$ (1)

We have the following identities useful for this case:

$sin(a-b) = sin(a) cos(b) - sin(b) cos(a)$

$cos(a-b) = cos(a) cos(b) + sin (a) sin(b)$

If we apply the identities into our equation (1) we got:

$tan(x-y) = \frac{sin(x) cos(y) - sin(y) cos(x)}{sin(x) sin(y) + cos(x) cos(y)}$ (2)

Now we can divide the numerator and denominato from expression (2) by $\frac{1}{cos(x) cos(y)}$ and we got this:

$tan(x-y) = \frac{\frac{sin(x) cos(y)}{cos(x) cos(y)} - \frac{sin(y) cos(x)}{cos(x) cos(y)}}{\frac{sin(x) sin(y)}{cos(x) cos(y)} +\frac{cos(x) cos(y)}{cos(x) cos(y)}}$

And simplifying we got:

$tan(x-y) = \frac{tan(x) -tan(y)}{1+ tan(x) tan(y)}$

And this identity is satisfied for all:

$(x-y) \neq \frac{\pi}{2} +n\pi$

8 0

3 years ago

URGENT

Nastasia [14]

Answer:

x45

Step-by-step explanation:

8 0

3 years ago