(1) y =z,y = 1, y = 2;

Please answer all questions.

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(i) y = 2°, y = 1, y = 2; (iii) y = 110, y =1°; (ii) y = 12z – 2, y = z° – 10z (iv) y = 5, y = 2, 1 = 0; (vi) y = a - 2, y = -a + lz – 2. (v) y = 2, y = Va,1 = 0; Present your answers to the problem in six tables (a subproblem a table) similar to the following table: Subproblem (+) | Answers R= the region bounded by the curves y = sin(x), y = cos(z), z = 0. (a) z = 1/4 I = 0, = sin(z), y = cos(x)) (b) R= (c) (cos(x) – sin(z)) dx = v2 – 1; area(R) = (d) area(R) 0.41421. Attention WTEX users: the formula I = 0, = sin(z), y= cos(x) I = 1/4 R = in the above table is produced with the following LVTEX code: R =\begin{pmatrix} x=0, & x=\pi/4 \\ y=\sin(x), & y=\cos (x) \end{pmatrix}

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1. (Areas of Plane Regions). For each of the subproblems below: (a) sketch the curves, shade the region R of the plane the curves bound; (b) represent the region R either as a Type I, I = a, y = g(x), y = f(x)) R= or Type II region, y = c, y =d R= z = g(y), I = f(y)) or as the union R= R, U...UR, of several Type I, or Type II regions, if necessary (in the last case please provide description of all the regions R.); (c) find the area of the region R; (d) round your result in (c) to five decimal places.