f(x, y) = x²x² and let R be the triangle bounded by the lines x = 5, x = y/2, and y = x in the xy-plane. R (a) Express / f dA as a double integral in two different ways by filling in the values for the integrals below. (For one of these it will be necessary to write the double integral as a sum of two integrals, as indicated; for the other, it can be written as a single integral.) √r f dA = fb fª f(x, y) d y where a = 0 d = 2x And f f dA=ffd f(x, y) d where a = , m = and q = d x ,b= 5 , b = 2 , n = , C = X + Smf f(x, y) d (b) Evaluate one of your integrals to find the value of f f dA. JR f dA= , C = , p = 1 and , d =

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f(x, y) = x²ex² and let R be the triangle bounded by the lines x = 5, x = y/2, and y = x in the xy-plane. R (a) Express f f dA as a double integral in two different ways by filling in the values for the integrals below. (For one of these it will be necessary to write the double integral as a sum of two integrals, as indicated; for the other, it can be written as a single integral.) fRf dA = få fd f(x,y) d y where a = 0 d = 2x And f f dA = √₂ fª f(x, y) d R where a = , m = and q = , b = , b = d x 5 d n = + fm f f(x,y) d (b) Evaluate one of your integrals to find the value of ff dA. √ Rf dA = C = X " C = , p = d and d =