The area (in sq. units) bounded between `y =2xln x and y =-x` from `x=e` to `x=2e` is

To find the area bounded between the curves \( y = 2x \ln x \) and \( y = -x \) from \( x = e \) to \( x = 2e \), we can follow these steps: ### Step-by-Step Solution 1. **Identify the curves and the area of interest**: We need to find the area between the curves \( y = 2x \ln x \) and \( y = -x \) from \( x = e \) to \( x = 2e \). 2. **Set up the integral**: The area \( A \) can be expressed as: \[ A = \int_{e}^{2e} \left( 2x \ln x - (-x) \right) \, dx = \int_{e}^{2e} (2x \ln x + x) \, dx \] 3. **Break down the integral**: We can split the integral into two parts: \[ A = \int_{e}^{2e} 2x \ln x \, dx + \int_{e}^{2e} x \, dx \] 4. **Calculate the first integral using integration by parts**: Let \( u = \ln x \) and \( dv = 2x \, dx \). Then, \( du = \frac{1}{x} \, dx \) and \( v = x^2 \). Using integration by parts: \[ \int 2x \ln x \, dx = x^2 \ln x - \int x^2 \cdot \frac{1}{x} \, dx = x^2 \ln x - \int x \, dx \] \[ = x^2 \ln x - \frac{x^2}{2} + C \] 5. **Evaluate the first integral from \( e \) to \( 2e \)**: \[ \int_{e}^{2e} 2x \ln x \, dx = \left[ x^2 \ln x - \frac{x^2}{2} \right]_{e}^{2e} \] Calculate at the upper limit \( x = 2e \): \[ = (2e)^2 \ln(2e) - \frac{(2e)^2}{2} = 4e^2 (\ln 2 + 1) - 2e^2 = 4e^2 \ln 2 + 4e^2 - 2e^2 = 4e^2 \ln 2 + 2e^2 \] Calculate at the lower limit \( x = e \): \[ = e^2 \ln e - \frac{e^2}{2} = e^2 - \frac{e^2}{2} = \frac{e^2}{2} \] Therefore, the first integral evaluates to: \[ \left( 4e^2 \ln 2 + 2e^2 \right) - \frac{e^2}{2} = 4e^2 \ln 2 + \frac{4e^2}{2} - \frac{e^2}{2} = 4e^2 \ln 2 + \frac{3e^2}{2} \] 6. **Calculate the second integral**: \[ \int_{e}^{2e} x \, dx = \left[ \frac{x^2}{2} \right]_{e}^{2e} = \frac{(2e)^2}{2} - \frac{e^2}{2} = \frac{4e^2}{2} - \frac{e^2}{2} = 2e^2 - \frac{e^2}{2} = \frac{4e^2}{2} - \frac{e^2}{2} = \frac{3e^2}{2} \] 7. **Combine the results**: \[ A = \left( 4e^2 \ln 2 + \frac{3e^2}{2} \right) + \frac{3e^2}{2} = 4e^2 \ln 2 + 3e^2 \] ### Final Answer The area bounded between the curves from \( x = e \) to \( x = 2e \) is: \[ A = 4e^2 \ln 2 + 3e^2 \]