vendor_guid,object_type,title,description,display_name,calculation_method,calculation_int,mastery_points,ratings
clontz-diff-eq_00_C1,outcome,00-C1: Homogeneous first-order linear IVP,,C1,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_01_C2,outcome,01-C2: Non-homogeneous first-order linear ODE,,C2,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_02_C3,outcome,02-C3: Homogeneous second-order linear ODE,,C3,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_03_C4,outcome,03-C4: Homogeneous second-order linear IVP,,C4,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_04_C5,outcome,04-C5: Non-homogeneous second-order linear ODE,,C5,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_05_D1,outcome,05-D1: Discontinuous functions and distributions,,D1,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_06_D2,outcome,06-D2: Laplace transforms from formula and definition,,D2,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_07_D3,outcome,07-D3: Inverse Laplace transforms,,D3,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_08_D4,outcome,08-D4: Using Laplace transforms to solve IVPs,,D4,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_09_F1,outcome,09-F1: Direction fields for first-order ODEs,,F1,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_10_F2,outcome,10-F2: Separation of variables,,F2,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_11_F3,outcome,11-F3: Techniques for linear IVPs,,F3,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_12_F4,outcome,12-F4: Implicit solutions for exact IVPs,,F4,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_13_F5,outcome,13-F5: Substitution strategies,,F5,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_14_X1,outcome,14-X1: Linear ODE systems,,X1,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_15_X2,outcome,15-X2: Existence/uniqueness theorem for linear IVPs,,X2,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess
clontz-diff-eq_16_X3,outcome,16-X3: Existence/uniqueness theorem for first-order IVPs,,X3,n_mastery,2,3,4,Exceeds Mastery,3,Meets Mastery,2,Near Mastery,1,Well Below Mastery,0,Insufficient Work to Assess