Compute the line integral | (yze*v= + y° + z - 2x) dr + (xze*# + 2ry) dy + (rye#"= + x + 32²) dz, where C is the curve in space with the parametrizations for 0 < t<1: r(t) = sin(at'24) +t!³, y(t) = t - to + 4, z(t) = t'1500 cos(at1830) + 1. 2021

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Compute the line integral | (yze*u= + y? + z – 2.x) d.r + (xze"² + 2ary) dy + (xye"v² + x+32²) dz, where C is the curve in space with the parametrizations for 0<t<1: *(t) = sin(at124) +t³, y(t) = t2021 – t° + 4, z(t) = t500 cos(rt1830) + 1.