CALCU-When a chemical reaction takes place, severa

Solution by Steps

step 1

To balance the chemical reaction, we need to equate the number of atoms for each element on both sides of the equation. The equation is:

x \text{Pb}(N_3)_2 + y \text{Cr}(MnO_4)_2 \rightarrow p \text{Cr}_2O_3 + q \text{MnO}_2 + r \text{Pb}_3O_4 + s \text{NO}

step 2

Count the number of atoms for each element on both sides. For the left side:

\text{Pb} = x, \text{Cr} = y, \text{Mn} = 2y, \text{N} = 6x, \text{O} = 8y

. For the right side:

\text{Pb} = 3r, \text{Cr} = 2p, \text{Mn} = 2q, \text{N} = s, \text{O} = 3p + 2q + s

step 3

Set up the equations based on the atom counts: 1.

x = 3r

(for Pb) 2.

y = 2p

(for Cr) 3.

2y = 2q

(for Mn) 4.

6x = s

(for N) 5.

8y = 3p + 2q + s

(for O)

step 4

The number of independent equations is 5, and the number of variables

x, y, p, q, r, s

is 6. Therefore, we can select 1 variable arbitrarily

Answer

The balanced chemical reaction has 5 independent equations and 6 variables, allowing for 1 variable to be selected arbitrarily.

Key Concept

Balancing chemical equations involves ensuring the number of atoms for each element is equal on both sides of the reaction.

Explanation

In this case, we derived 5 equations from the atom counts, and since there are 6 variables, we can freely choose one variable, which is essential for solving the system.

deal with it with matrix

Generated Graph

Solution by Steps

step 1

We start with the equation for junction A: 85 cars/h enter junction A, of which

X_1

cars/h head to junction B and the remaining

X_2

cars/h move towards junction C. Thus, we can express this as:

X_2 = 85 - X_1

step 2

At junction C, an additional 60 cars/h enter. The total cars/h crossing junction C is

X_2 + 60

. Out of these, 70 cars/h head to junction D, and the remaining

X_3

cars/h travel to junction B. Therefore, we can write:

X_3 = (X_2 + 60) - 70

or

X_3 = X_2 - 10

step 3

We substitute

X_2

from step 1 into the equation from step 2:

X_3 = (85 - X_1) - 10

, which simplifies to

X_3 = 75 - X_1

step 4

From the information given, we know that of the 70 cars/h that travel towards junction D, 45 cars/h travel to junction B, and the remaining 25 cars/h leave the network. This means that the total cars/h traveling to junction B is

X_1 + X_3 + 45

. Setting this equal to the total cars/h entering junction B gives us:

X_1 + (75 - X_1) + 45 = 85

step 5

Simplifying the equation from step 4:

X_1 + 75 - X_1 + 45 = 85

leads to

120 = 85

, which is a contradiction. Thus, we need to check our assumptions and constraints. The values of

X_1

,

X_2

, and

X_3

must be non-negative and satisfy the flow conditions

Answer

The values of

X_1

,

X_2

, and

X_3

must be determined under the constraints of the traffic flow, leading to a contradiction in the current setup. Further analysis is needed to find valid values.

Key Concept

Traffic flow analysis involves setting up equations based on the flow of cars through junctions and ensuring conservation of flow.

Explanation

The contradiction indicates that the initial assumptions about the flow may need to be revisited, or additional constraints may need to be considered to find valid values for

X_1

,

X_2

, and

X_3

.

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