ANSWERRR ILL GIVE YOU BRAINLIST !!!! What type of slope is this line?

Mathematics

1 answer:

alukav5142 [94]3 years ago

4 0

Answer:

Negative

Step-by-step explanation:

You might be interested in

Bruh Bruh Bruh Bruh Bruh Bruh Bruh

Romashka-Z-Leto [24]

Answer:

Bruh?

Step-by-step explanation:

Bruh Bruh

5 0

3 years ago

Read 2 more answers

Find the sum of the first four terms of the geometric sequence shown below. 4, 4/ 3, 4/9, ...

user100 [1]

It's evident that the first four terms are 4, 4/3, 4/9, and 4/27. So the fourth partial sum of the series is

$S_4=4+\dfrac43+\dfrac49+\dfrac4{27}$

It's as easy as adding up the fractions, but I bet this is supposed to be an exercise in taking advantage of the fact that the series is geometric and use the well-known formula for computing such a sum.

Multiply the sum by 1/3 and you have

$\dfrac13S_4=\dfrac43+\dfrac49+\dfrac4{27}+\dfrac4{81}$

Now subtracting this from $S_4$ gives

$S_4-\dfrac13S_4=4-\dfrac4{81}$

That is, all the matching terms will cancel. Now solving for $S_4$ , you
have

$\dfrac23S_4=4\left(1-\dfrac1{81}\right)$
$S_4=6\left(1-\dfrac1{81}\right)$
$S_4=\dfrac{480}{81}=\dfrac{160}{27}$