(12-2 x 10-2) 603 Evaluate this

Mathematics

1 answer:

lana66690 [7]3 years ago

3 0

Answer:

x=−593/20

Step-by-step explanation:

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-2 x 3/7<br> please help me!

Dimas [21]

Step-by-step explanation:

-2 x 3/7 = (-2 x 3) /7

= -6/7

7 0

3 years ago

Read 2 more answers

Round 7,425 to nearest thousand

Aliun [14]

Answer:

7000

Step-by-step explanation:

The second number is smaller than 5 so we keep the previous number(7) the same.

3 0

3 years ago

Tan(x+pi) + 2sin(x+pi)=0<br><br>can you help prove this and make the left side equal the right?

vladimir1956 [14]

This is not an identity but an equation. You're supposed to find the values of $x$ for which this is true. It is *not* true for all values of $x$ .

To see why:

$\tan x$ has period $\pi$ , which means $\tan(x+\pi)=\tan x$ .

The angle sum identity for $\sin x$ says that

$\sin(x+\pi)=\sin x\cos \pi+\cos x\sin\pi=-\sin x$

$\tan(x+\pi)+2\sin(x+\pi)=\tan x-2\sin x$

By definition of $\tan x$ ,

$\tan x=\dfrac{\sin x}{\cos x}$

and so

$\tan x-2\sin x=\sin x\left(\dfrac1{\cos x}-2\right)$

which is only 0 if either $\sin x=0$ (which only happens for certain values of $x$ ) or $\dfrac1{\cos x}-2=0\implies\cos x=\dfrac12$ (which also only happens for certain values of $x$ ). It's these values of $x$ you want to find.

$\sin x=0$ whenever $x$ is a multiple of $\pi$ , i.e. $x=n\pi$ for any integer $n$ .

If $0\le x$ , then $\cos x=\dfrac12$ is true for $x=\dfrac\pi3$ and $x=\dfrac{5\pi}3$ . Then to account for all other possible values, we add a multiple of $2\pi$ , so that $x=\dfrac\pi3+2n\pi$ or $x=\dfrac{5\pi}3+2n\pi$ for integers $n$ .