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4 years ago

Question 3 (True/False Worth 2 points) (LC)

1 answer:

6 0

this is true because civil cases can be as simple as telling someone that they are bad or mean comments and then it can be saying our president neads to die

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Can someone solve this for me pls

olchik [2.2K]

Answer: the answer is, Over my shoulder, eyes peeking in
Analyze my every move, what current state I'm in
'Cause you are colder than ice on my skin
Wanna get that A+,

4 0

3 years ago

What are the 3 common mistakes throwing a football

Maru [420]

So what is your question?

7 0

3 years ago

An article is bought and sold with a profit of 25% of selling price,find the profit percent

zvonat [6]

Answer:

Explanation:

profit percent = Sp-Cp/Cp * 100%

Sp is the selling price

Cp is the cost price

Let the selling price of the article be x

If it is sold with a profit of 25% of selling price, then;

Profit = 0.25x

Since Profit = Sp - Cp

0.25x = x - Cp

Cp = x - 0.25x

Cp = 0.75x

Substitute into the formula

Profit percent = 0.25x/0.75x * 100

Profit percent = 0.25/0.75 * 100

Profit percent = 1/3 * 100

Profit percent = 33.3%

Hence the profit percent is 33.3%

7 0

3 years ago

I can’t figure this problem out

Natalka [10]

Answer:

Explanation:

Alright so the way to do this is to use properties of integrals to make our life easier.

So we have:

$\int\limits^4_1 {(3f(x)+2)} \, dx$

So lets break this up into two different integrals that represent the same area.

$\int\limits^4_0 {f(x)} \, dx - \int\limits^1_0 {f(x)} \, dx = \int\limits^4_1 {f(x)} \, dx$

Lets think about what is going on up there. The integral from four to zero gives us the area under the curve of f(x) from four to zero. If we subtract this from the integral from one to zero (the area under f from one to zero) we are left with the area under f from four to one! Hence:

$\int\limits^4_1 {f(x)} \, dx$

But since we have these values we can say that:

-3 - 2 = -5

Which means that $\int\limits^4_1 {f(x)} \, dx$ = -5

So now we can evaluate $\int\limits^4_1 {(3f(x)+2)} \, dx$

Lets first break up our integrand into two integrals

$\int\limits^4_1 {(3f(x)+2)} \, dx$ = $3\int\limits^4_1{f(x)} \, dx + 2\int\limits^4_1 {} \, dx$

Now we can evaluate this:

We know that $\int\limits^4_1 {f(x)} \, dx$ = -5

So:

$3(-5)+2[x]$ where x is evaluated at 4 to 1 so

-15 + 2(3)

So we are left with -15 + 6 = -9

5 0

3 years ago

According to current stastics the most preventable cause of death in the us is

Semmy [17]

Answer:

Smoking.

Explanation:

6 0

3 years ago