LU ueta You throw a ball (from ground level) of mass 1 kilogram upward with a velocity of vo = 30 on Mars, where the force (acceleration) of gravity is m 9 = -3.711-2 A. Approximate, to two decimal places, how long will the ball be in the air on Mars? seconds B. Approximate, to two decimal places, how high the ball will go? meters Ly 0/1 pt 20 Details Find all solutions to the differential equation. Use C1, C2, and c3 to denote arbitrary constants. To avoid needless complexity, and to receive credit, be sure to absorb any constant factors into the constants C1, C2, and c3. For instance, it is better to express 3c1 as simply c1, since c1 is just as arbitrary a constant as 3c1. y"= -312 + etz y : Question Help: Video B Written Example Message instructor Submit Question Question 9 0/1 pt 9 20 @ Details Find all solutions to the differential equation. Use C1, C2, and c3 to denote arbitrary constants. To avoid needless complexity, and to receive credit, be sure to absorb any constant factors into the constant as 3c1. constants C1, C2, and C3. For instance, it is better to express 3c1 as simply C1, since cy is just as arbitrary a y"= - cos(4x) y = Question 10 0/1 pt ) 20 @ Details Solve the initial value problem. y'= tan(5x), y(67) = 9 Question Help: Written Example Message instructor Submit Question Question 11 Co/1 pt 9 20 @ Details Solve the initial value problem. y"= 2 + sin(2x), y(0) = -3, y'(0) = -4, y"(0) = 3 Question Help: Video B Written Example Message instructor Submit Question Question 12 0/1 pt 9 20 @ Details Find the two values of k for which y() = eka is a solution of the differential equation y'-14y'+40y = 0. smaller value = larger value = Question Help: Video B Written Example Message instructor