instruction

please do question 3 and 4

Design for DHE tale Te p aata Tea - 1 aip party plalaam pen - 14 panage turtlary Heal ) - A - w - ASUA Vivobook lora pa * 9 2 7 40 9 O P H K L B. N N W M to the group supervisor by e-mail 4. Each group member needs to fill in a peer assessment score sheet. All score sheets from a group must be submitted to the supervisor by single e-mail with the group number in the subject of the e-mail 5. Mathematical programme A mathematical programme will be required to solve the boundary layer problem, which involves solving the ordinary differential equations given by Equations 11 and 12 subject to the boundary conditions given by Equations 13 and 14 in the Boundary Layer paper. In the model we will only consider the boundary conditions where C 0 and = 0 (see Equation 5 of Boundary Layor paper). The computer programme should be clearly annotated with comments to make it understandable by the marker 5. Written Report One report should to submitted per group. The written report should comply to the pago irits for each Section. Formatting should be Arial-font, font size 11, line spacing single and with a minimum of 2 cm margins. 6.1 Introduction to Boundary Layer Theory (maximum 3 pages) - Provide a summary of section 2 in the Boundary Layer paper, which describes the mathematical model used for solving the continuity equation, and the differential momentum 6.1 Introduction to Boundary Layer Theory (maximum 3 pages) - Provide a summary of section 2 in the Boundary Layer paper, which describes the mathematical model used for solving the continuity equation, and the differential momentum and mole balances. This summary should 1. Describe the assumptions used to derive the differential balances given by Equation 1 to 3 in the Boundary Layer paper 2. Explain the meaning of a stream function and why it is introduced in order to solve the boundary layer equations 3. Discuss how the similarity variable y is used to simplify the boundary layer equations. 4. Include a figure with a schematic of the flat plate along with the coordinate axis and hypothetical velocity and concentration profiles. Label as much as possible. 5. There should also be a discussion on the meaning of the dimensionless properties 1). f.f.. Sc, and B and how these relate to the velocity and concentration profiles. 5 Sunny