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3 years ago

How do we simplify x/4 + x +1/8?

Mathematics

2 answers:

LekaFEV [45]3 years ago

7 0

Answer:

12x+4

Step-by-step explanation:

Cross multiply denominators by numerators so:

8(x)+ 4(x+1)

8x+4x+4

Collect like terms to get 12x+4

Rama09 [41]3 years ago

3 0

Answer:

L.C.M=8

Multiply all terms by l.c.m

so...; 8(x/4)+8(x)+8 (1/8)

2 (x)+8 (x)+1 (1)

2x+8x+1

We can simplify through eith the co-efficient ofX

Step-by-step explanation:

so:10x+1

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If you roll two fair six-sided dice, what is the probability that a least one dice shows a 3?

34kurt

Answer:

11/36

Step-by-step explanation:

So here’s the probability of rolling one three or more on one dice:

2,3

1,3. 5 chance of at least one 3 on this dice

4,3

5,3

6,3

On other die:

3,2

3,4

3,1

3,5

3,6. 6 chance of rolling at least one 3 on this dice

3,3

5+6=11

11/36 possible combinations contain at least one three

Hope this helps!

4 0

3 years ago

Please help me with this geometry question :((

Mumz [18]

Step-by-step explanation:

the proportion that contains BC and FI :

BC / FG = proportion

8/4= proportion

2= proportion

BC/FI=8/3

6 0

4 years ago

Read 2 more answers

I need help with Inverses

Morgarella [4.7K]

The inverse function is just:

m(p) = 4p - 28

So the correct option is B.

<h3>How to get the inverse function?</h3>

Here we start with the given function:

$p(m) = \frac{m}{4} + 7$

To find the inverse m(p), we need to isolate the variable m in one side of the given function.

If we subtract 7 in both sides, we will get:

$p - 7 = \frac{m}{4}$

If now we multiply both sides by 4, we get:

$4*(p - 7) = m\\\\4p - 28 = m$

Then the inverse function is just:

$m(p) = 4p - 28$

If you want to learn more about inverse functions:

brainly.com/question/14391067

#SPJ1

8 0

2 years ago

Find the 12th term of the geometric sequence 7, -35, 175

Svetllana [295]

Answer:

$a_{12}= -341,796,875$

Step-by-step explanation:

Given geometric sequence is: 7, -35, 175

$a_1= 7$

$r= \frac{-35}{7}=-5$

n = 12

nth term of a geometric sequence is given as:

$a_n= ar^{n-1}$

Plug the values of a, r and n in the above equation, we find:

$a_{12} = 7\times (-5)^{12-1}$

$a_{12}= 7\times (-5)^{11}$

$a_{12}= 7\times -48,828,125$

$\purple {\bold {a_{12}= -341,796,875}}$

3 0

3 years ago

And that the terms of this series may be arranged without changing the value of the series, determine the sum of the reciprocals

nignag [31]

The terms of this series may be arranged without changing the value of the series. The sum of the reciprocals of the squares of the odd positive integers is $\pi ^{2} /8$ .

In mathematics, a sequence is the cumulative sum of a given collection of terms. Usually, those phrases are actual or complicated numbers, but plenty of extra generalities are feasible.

A series is described as an arrangement of numbers in a specific order. then again, a chain is described as the sum of the factors of a sequence.

In mathematics, a series is, more or less speaking, a description of the operation of including infinitely many quantities, one after the alternative, to a given beginning quantity. The look at of series is a primary part of calculus and its generalization, mathematical analysis.

k=1

1/(1)2+1/(2)2+1/(3)2+1/(4)2+1/(5)2+1/(6)2+1/(7)2+.

up to ∞ terms = 2/6

[1/(1)2+1/(3)2+1/(5)2+1/(7)2+]+[1/(2)²+1/(4)²+1/(6)²+

..∞0] = T²/6

→ [1/(1)² + 1/(3)² + 1/(5)2+1/(7)2+......00] + [1/4 (1)² + 1/4(2)²+

1/4(3)²+....0] =²/6

[1/(1)²+1/(3)²+1/(5)2+1/(7)2+.......)] + 1/4[1/(1)² + 1/(2)²+

1/(3)²+....x] = 2/6

⇒ [1/(1)² + 1/(3)² + 1/(5)²+1/(7)²+..] + 1/4 [π²/6] = 2/6

⇒ [1/(1)² + 1/(3)² + 1/(5)²+1/(7)²+] = (1-1/4)/6

⇒ [1/(1)²+1/(3)2+1/(5)2+1/(7)2+..∞ = 3/4 x π²/6

↑

[1/(1)2+1/(3)2+1/(5)2+1/(7)²+] = 2/8

Learn more about the series here brainly.com/question/24295771

#SPJ4

4 0

1 year ago

How do we simplify x/4 + x +1/8? ​

How do we simplify x/4 + x +1/8?