Suppose a bond with annual coupons has a price of $1,071.06, a face value of $1000 and a yield to maturity of 7%. This bond's coupon rate is closest to:

PS. There is no missing data in this question.

a. 6.5% b. 5.5% c. 7.5% d. 6.0%

Question 6 Not yet answered Marked out of 5.00 p Flag question Let Abe a 10x 10 matrix with real number entries and let {V1, V2, V3, V4, V5, V6, V7, V9, V9, V10} be a basis for R 10. The followings are given: AV1 = 2V1 (A-110) V2 = V2 (A+3/10) V3 = 513 (A+2410) V4=V4 Av5=5v5 (A-3110) V6 = 2V6 (A-2110 v7 = -317 (A-2110) V8 = 0 (A+10) vy=6V9 AV10 = -2V10 Choose the true choices about eigenvalues of A and their algebraic multiplicities and diagonalizability of A. ***There are exactly 5 true choices. You will loose 1 credit from each wrong answer you have chosen. Select one or more: a. 1=5 is an eigenvalue of A with algebraic multiplicity E5 = 3. b.1=5 is an eigenvalue of A with algebraic multiplicity E5 = 2. c. A is not diagonalizable. d. 1 = -1 is an eigenvalue of A with algebraic multiplicity E-1 =4 e. 1 = -1 is an eigenvalue of A with algebraic multiplicity E-1 = 2. f.1 = -2 is an eigenvalue of A with algebraic multiplicity &z=1. 8.1 = 2 is an eigenvalue of A with algebraic multiplicity E2 = 4. h. 1 = 6 is an eigenvalue of A with algebraic multiplicity E2 = 1. 1.1=2 is an eigenvalue of A with algebraic multiplicity &z=2. j. 1 = 1 is an eigenvalue of A with algebraic multiplicity &q = 6. k. 1 = -3 is an eigenvalue of A with algebraic multiplicity -3 = 1. 1.1 = 1 is an eigenvalue of A with algebraic multiplicity E7 = 2. m. A is diagonalizable. n. 1 = 0 is an eigenvalue of A with algebraic multiplicity &o=1. U ] Question 6 Not yet answered Marked out of 5.00 p Flag question Let Abe a 10x 10 matrix with real number entries and let {V1, V2, V3, V4, V5, V6, V7, V9, V9, V10} be a basis for R 10. The followings are given: AV1 = 2V1 (A-110) V2 = V2 (A+3/10) V3 = 513 (A+2410) V4=V4 Av5=5v5 (A-3110) V6 = 2V6 (A-2110 v7 = -317 (A-2110) V8 = 0 (A+10) vy=6V9 AV10 = -2V10 Choose the true choices about eigenvalues of A and their algebraic multiplicities and diagonalizability of A. ***There are exactly 5 true choices. You will loose 1 credit from each wrong answer you have chosen. Select one or more: a. 1=5 is an eigenvalue of A with algebraic multiplicity E5 = 3. b.1=5 is an eigenvalue of A with algebraic multiplicity E5 = 2. c. A is not diagonalizable. d. 1 = -1 is an eigenvalue of A with algebraic multiplicity E-1 =4 e. 1 = -1 is an eigenvalue of A with algebraic multiplicity E-1 = 2. f.1 = -2 is an eigenvalue of A with algebraic multiplicity &z=1. 8.1 = 2 is an eigenvalue of A with algebraic multiplicity E2 = 4. h. 1 = 6 is an eigenvalue of A with algebraic multiplicity E2 = 1. 1.1=2 is an eigenvalue of A with algebraic multiplicity &z=2. j. 1 = 1 is an eigenvalue of A with algebraic multiplicity &q = 6. k. 1 = -3 is an eigenvalue of A with algebraic multiplicity -3 = 1. 1.1 = 1 is an eigenvalue of A with algebraic multiplicity E7 = 2. m. A is diagonalizable. n. 1 = 0 is an eigenvalue of A with algebraic multiplicity &o=1. U ]