MATHEMATICS HIGH SCHOOL

What fraction has a value that's equal to 3/4

Answers

Answer 1

Answer:

Fractions are always represented in the numerator and denominator forms.

The final fraction form that is equivalent to 3/4 is 6/8, 9/12.

How to calculate the fractions?

The below expressions can give us a better idea to solve any fractions.

$(a/b)/(c/d)=(a * d)/( b * c)$

Calculations:

$\begin{aligned}(3)/(4)&=(3 * 2)/(2 * 4)\n&=(6)/(8) \end{aligned}$

Thus, the value of the final fraction is 6/8.

To know more about the fractions, please refer to the link:

brainly.com/question/1301963

Answer 2

Answer: There are several fractions with values equal to 3/4. To find them, just multiply the numerator and denominator by the same number.

3 x 2 = 6
4 x 2 = 8

Therefore, 6/8 is equal to 3/4. You could do this with 4, too, to get 12/16, or any other number beyond that.

Hope this helps!

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A local mechanic charges customers a flat fee of $60 before any work is done and a rate of $85 per hour of labor which equation represents the relationship between the total charge of labor L in dollars and the number of hours worked H. A.) H=85L+6B.) L=145H
C.) L=60H+85
D.) L=85H+60

Answers

Answer:

L=85H+60

Step-by-step explanation:

i know

Answer:

L=85H+60

Step-by-step explanation:

4. Find the sum of the first eighteen terms of the arithmetic sequence whose nthterm is an = 15 + 8n.
a. 1438
b. 1638
c. 1836
d. 1783

Answers

Answer:

The sum of first eighteen terms of the arithmetic sequence is $\mathbf{S_(18)=1638}$

Option B is correct option.

Step-by-step explanation:

We need to find the sum of the first eighteen terms of the arithmetic sequence whose nth term is an = 15 + 8n

The formula used to calculate sum of arithmetic sequence is: $S_n=(n)/(2)(a_1+a_n)$

Finding a₁ by putting n=1

$a_n=15+8n\na_(1)=15+8(1)\na_(1)=15+8\na_(1)=23$

We have $a_1=23$

Finding 18th term n=18

$a_n=15+8n\na_(18)=15+8(18)\na_(18)=15+144\na_(18)=159$

So, the sum of first eighteen terms of the arithmetic sequence is:

$S_n=(n)/(2)(a_1+a_n)\nS_(18)=(n)/(2)(a_1+a_(18))\nS_(18)=(18)/(2)( 23+159)\nS_(18)=9(182)\nS_(18)=1638$

So, the sum of first eighteen terms of the arithmetic sequence is $\mathbf{S_(18)=1638}$

Option B is correct option.

Paulo uses an instrument called a densitometer to check that he has the correct ink colour.For this print job the acceptable range for the reading on the densitometer is 1.8 ± 10%.

What is the acceptable range for the densitometer reading?

exactly 1.8

from 0 to 3.6

from 1.0 to 2.6

from 1.62 to 1.98

from 1.8 to 1.98

Answers

If it is said that the range of the answer should be +/- 10% of the particular value, we have to find out the percentage of that particular value. Therefore 10% of 1.8 is,

1.8 * 10/100 = 0.18

If we add this value to the original value,
1.8+0.18 = 1.98

If we subtract this value from the original value,
1.8-0.18 = 1.62

therefore the range will be,
from 1.62 to 1.98

Simplify 5w-4+3+7. ??????????

Answers

the answer is 5w+6 =)))))))

Solve for x 4x-4<8 and 9x+5>23

Answers

Answer:idk

Step-by-step explanation:

Answer:

9x > 18

Step-by-step explanation:

Answer:

(i) x<3

(ii) x > 2

Step-by-step explanation:

4x - 4 < 8

Add 4 to both sides of the equation , that is

4x - 4 + 4 < 8 + 4

4x < 12

divide through by 4

x<3

Also

9x + 5 > 23

subtract 5 from both sides , that is

9x > 18

x > 2

What is the solution to the compound inequality?

Answers

$7x+(3)/(4)\geq13|\cdot4\n28x+3\geq52\n28x\geq49\nx\geq(49)/(28)\nx\geq(7)/(4)\n\n(5)/(2)x-(1)/(3)\geq-(11)/(2)|\cdot6\n15x-2\geq-33\n15x\geq-31\nx\geq-(31)/(15)\n\nx\geq-(31)/(15) \vee x\geq(7)/(4)\n\boxed{x\geq-(31)/(15)}$

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