If n+3p6:n+2p4=14:1.find .n

To find the value of n, we need to solve the equation:

(n + 3p6) : (n + 2p4) = 14 : 1

First, let's simplify the equation by substituting the values of p6 and p4 with their corresponding values. Assuming p6 refers to the number 6 and p4 refers to the number 4, we have:

(n + 3*6) : (n + 2*4) = 14 : 1
(n + 18) : (n + 8) = 14 : 1

Now, we can cross-multiply the fractions:

14(n + 18) = 1(n + 8)

Expand both sides:

14n + 252 = n + 8

Bring all the terms involving n to one side:

14n - n = 8 - 252
13n = -244

Divide both sides by 13:

n = -244/13

So the value of n is approximately -18.769.

To find the value of "n" in the equation (n + 3p6) / (n + 2p4) = 14:1, we can follow these steps:

Step 1: Understand the equation.
- In the equation, (n + 3p6) represents the numerator, while (n + 2p4) represents the denominator.
- The ratio of the numerator to the denominator is given as 14:1.

Step 2: Write an equation based on the information given.
- Since the ratio of the numerator to the denominator is 14:1, we can write the equation as:
(n + 3p6) / (n + 2p4) = 14/1

Step 3: Cross-multiply and simplify the equation.
- Cross-multiplying the equation gives us:
14 * (n + 2p4) = 1 * (n + 3p6)

Expanding the terms:
14n + 28p4 = n + 3p6

Simplifying the equation by combining like terms:
14n - n = -3p6 + 28p4

13n = 25p4

Step 4: Solve for "n."
- To solve for "n," divide both sides of the equation by 13:
(13n) / 13 = (25p4) / 13

Simplifying:
n = 25p4 / 13

Therefore, the value of "n" is given by n = 25p4 / 13.

Like fraction 8.73,87.3

the proportion can be written as

(n+3p^6)/(n+2p^4 = 14/1
n + 3p^6 = 14n + 28p^4)
14n + 28p^4 = n + 3p^6
13n = 3p^6 - 28p^4
n = p^4(3p^2 - 28)/13