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To solve this problem, we can use the adiabatic process equation for an ideal gas:

P1 * V1^γ = P2 * V2^γ

where: P1 = initial pressure V1 = initial volume P2 = final pressure V2 = final volume γ = heat capacity ratio (for a monoatomic gas, γ = 5/3)

Given: P1 = unknown (initial pressure is not provided) V1 = unknown (initial volume is not provided) P2 = unknown (final pressure is not provided) V2 = 1/4 (quarter) of the original volume, which means V2 = 1/4 * V1 γ = 5/3

We need to find the temperature of the gas after compression (T2). Since the gas is ideal, we can also use the ideal gas law:

P1 * V1 / T1 = P2 * V2 / T2

We can simplify this equation using the relation V2 = 1/4 * V1:

P1 * V1 / T1 = P2 * (1/4 * V1) / T2

Cancelling V1:

P1 / T1 = P2 / (4 * T2)

Now we can substitute the adiabatic process equation (P1 * V1^γ = P2 * V2^γ) into the equation above:

(P1 * V1^γ) / T1 = (P2 * (1/4 * V1)^γ) / T2

Simplifying:

P1 / T1 = P2 / (4^γ * T2)

Substituting γ = 5/3:

P1 / T1 = P2 / (4^(5/3) * T2)

Since the process is adiabatic, there is no heat exchange (Q = 0), which implies the temperature remains constant (T1 = T2):

P1 / T1 = P2 / (4^(5/3) * T1)

Rearranging the equation to solve for T1:

T1 = (P1 * 4^(5/3) * T1) / P2

Dividing both sides by T1:

1 = (P1 * 4^(5/3)) / P2

Rearranging and solving for P1:

P1 = P2 / 4^(5/3)

Now we can substitute this value of P1 back into the equation for T1:

T1 = (P1 * 4^(5/3) * T1) / P2

Simplifying:

T1 = 4^(5/3) * T1

Dividing both sides by T1:

1 = 4^(5/3)

Taking the cube root of both sides:

1 = 4^(5/9)

Simplifying:

1 = 2^(5/9)

Taking the 9th root of both sides:

1^(1/9) = 2^(5/9)^(1/9)

1 = 2^(5/81)

Since 1 is not equal to 2^(5/81), the equation does not hold true.

Therefore, the given conditions do not satisfy the laws of adiabatic compression, and we cannot determine the temperature of the gas after compression with the provided information.

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