by Morris Graham | Mar 23, 2020 | Uncategorized
Verifying Identities Assignment Directions: Please work the following problems on a separate sheet of paper and turn it in at the beginning of class on Monday 03/09/20. 1. Verify the following identities. (a) sec θ+tan θ cot θ+cos θ = tan θ sec θ (b) 3 sin2 θ + 4 cos2...
by Morris Graham | Mar 23, 2020 | Uncategorized
#1 Points possible: 3. Total attempts: 3 Evaluate the following expressions. Your answer must be an angle in radians and in the interval [−π2,π2][-π2,π2]. (a) sin−1(−√22)=sin-1(-22)= (b) sin−1(12)=sin-1(12)= (c) sin−1(√32)=sin-1(32)= #2 Points possible: 3....
by Morris Graham | Mar 23, 2020 | Uncategorized
#1 Points possible: 3. Total attempts: 3 Evaluate the following expressions. Your answer must be an angle in radians and in the interval [−π2,π2][-π2,π2]. (a) sin−1(−√22)=sin-1(-22)= (b) sin−1(12)=sin-1(12)= (c) sin−1(√32)=sin-1(32)= #2 Points possible: 3....
by Morris Graham | Mar 23, 2020 | Uncategorized
#1 Points possible: 3. Total attempts: 3 Evaluate the following expressions. Your answer must be an angle in radians and in the interval [−π2,π2][-π2,π2]. (a) sin−1(−√22)=sin-1(-22)= (b) sin−1(12)=sin-1(12)= (c) sin−1(√32)=sin-1(32)= #2 Points possible: 3....
by Morris Graham | Mar 23, 2020 | Uncategorized
#1 Points possible: 3. Total attempts: 3 Evaluate the following expressions. Your answer must be an angle in radians and in the interval [−π2,π2][-π2,π2]. (a) sin−1(−√22)=sin-1(-22)= (b) sin−1(12)=sin-1(12)= (c) sin−1(√32)=sin-1(32)= #2 Points possible: 3....
by Morris Graham | Mar 23, 2020 | Uncategorized
#1 Points possible: 3. Total attempts: 3 Evaluate the following expressions. Your answer must be an angle in radians and in the interval [−π2,π2][-π2,π2]. (a) sin−1(−√22)=sin-1(-22)= (b) sin−1(12)=sin-1(12)= (c) sin−1(√32)=sin-1(32)= #2 Points possible: 3....
