أسواق
27-10-2013, 12:50 AM
حل واجب M132 اتصل 0544321455/00966544321455 ايميل [email protected] (http://www.aswaqcity.com/thread1310694.html)
حل واجبات الجامعة العربية المفتوحة
اتصل : O544321455 - OO966544321455
واتس اب: 966544321455+
ايميل : [email protected]
سكايبي : a_al_shora
حل واجب (http://www.aswaqcity.com/thread1310694.html) 0.5.4.4.3.2.1.4.5.5 الجامعة العربية المفتوحة
حل واجبات الجامعة العربية المفتوحة O54.4.3.2.1.4.5.5 - OO96654.4.3.2.1.4.5.5
ايميل : a_al_shora @ h.o.t.m.ail.c.o.m
سكايبي: a_al_shora
واتس اب: OO96654.4.3.2.1.4.5.5
M132: LINEAR ALGEBRA
M132 TMA Feedback Form
Q−1:[5×2 marks]
Answer each of the following as True or False (justify your answer):
a) If m1 ≠m2 in the system , where m1 , m2 , b1 , and b2 are constants, then the system has a unique solution.
b) If (c1 , c2) is a solution of the 2 x 2 system , then, for any real number k, the ordered pair (kc1 , kc2) is a solution.
c) If AB = 0, thenA = B = 0.
d) The vectors are linearly independent.
e) The vectors form a linear combination with .
Q−2: [1+3+2 marks]For the system:
a) Write the coefficient matrix A of the system
b) Find det(A)
c) Compute |-2A.AT.A-1|
Q−3:[1+4 marks]Consider the linear system:
a) Write the augmented matrix for the system.
b) Solve the system by applying the Gaussian elimination method.
Q¬−4:[2+2+2 marks]Let
a) FindC(AT +2B)
b) Find BA - CD.
c) FindD2 -2C.
Q¬−5:[1 + 2 + 2 marks]. Consider the linear system: .
a) Write the linear system in matrix form .
b) Find a matrix C such that .
c) Find the matrix B such that .
Q−6:[2+1+1 marks]Consider a linear system whose augmented matrix is of the form:
. For what values of a and b will the system have:
a) No Solution; b) A unique solution; c) Infinitely many solutions.
Q¬−7:[2+2+1 marks]Let A= .
a) Find a matrix B that is row alent to A.
b) Determine whether the fourth column vector forms a linear combination with the first three column vectors.
c) Show that the first three column vectors are linearly independent. Explain.
حل واجبات الجامعة العربية المفتوحة
اتصل : O544321455 - OO966544321455
واتس اب: 966544321455+
ايميل : [email protected]
سكايبي : a_al_shora
حل واجب (http://www.aswaqcity.com/thread1310694.html) 0.5.4.4.3.2.1.4.5.5 الجامعة العربية المفتوحة
حل واجبات الجامعة العربية المفتوحة O54.4.3.2.1.4.5.5 - OO96654.4.3.2.1.4.5.5
ايميل : a_al_shora @ h.o.t.m.ail.c.o.m
سكايبي: a_al_shora
واتس اب: OO96654.4.3.2.1.4.5.5
حل واجبات الجامعة العربية المفتوحة
اتصل : O544321455 - OO966544321455
واتس اب: 966544321455+
ايميل : [email protected]
سكايبي : a_al_shora
حل واجب (http://www.aswaqcity.com/thread1310694.html) 0.5.4.4.3.2.1.4.5.5 الجامعة العربية المفتوحة
حل واجبات الجامعة العربية المفتوحة O54.4.3.2.1.4.5.5 - OO96654.4.3.2.1.4.5.5
ايميل : a_al_shora @ h.o.t.m.ail.c.o.m
سكايبي: a_al_shora
واتس اب: OO96654.4.3.2.1.4.5.5
M132: LINEAR ALGEBRA
M132 TMA Feedback Form
Q−1:[5×2 marks]
Answer each of the following as True or False (justify your answer):
a) If m1 ≠m2 in the system , where m1 , m2 , b1 , and b2 are constants, then the system has a unique solution.
b) If (c1 , c2) is a solution of the 2 x 2 system , then, for any real number k, the ordered pair (kc1 , kc2) is a solution.
c) If AB = 0, thenA = B = 0.
d) The vectors are linearly independent.
e) The vectors form a linear combination with .
Q−2: [1+3+2 marks]For the system:
a) Write the coefficient matrix A of the system
b) Find det(A)
c) Compute |-2A.AT.A-1|
Q−3:[1+4 marks]Consider the linear system:
a) Write the augmented matrix for the system.
b) Solve the system by applying the Gaussian elimination method.
Q¬−4:[2+2+2 marks]Let
a) FindC(AT +2B)
b) Find BA - CD.
c) FindD2 -2C.
Q¬−5:[1 + 2 + 2 marks]. Consider the linear system: .
a) Write the linear system in matrix form .
b) Find a matrix C such that .
c) Find the matrix B such that .
Q−6:[2+1+1 marks]Consider a linear system whose augmented matrix is of the form:
. For what values of a and b will the system have:
a) No Solution; b) A unique solution; c) Infinitely many solutions.
Q¬−7:[2+2+1 marks]Let A= .
a) Find a matrix B that is row alent to A.
b) Determine whether the fourth column vector forms a linear combination with the first three column vectors.
c) Show that the first three column vectors are linearly independent. Explain.
حل واجبات الجامعة العربية المفتوحة
اتصل : O544321455 - OO966544321455
واتس اب: 966544321455+
ايميل : [email protected]
سكايبي : a_al_shora
حل واجب (http://www.aswaqcity.com/thread1310694.html) 0.5.4.4.3.2.1.4.5.5 الجامعة العربية المفتوحة
حل واجبات الجامعة العربية المفتوحة O54.4.3.2.1.4.5.5 - OO96654.4.3.2.1.4.5.5
ايميل : a_al_shora @ h.o.t.m.ail.c.o.m
سكايبي: a_al_shora
واتس اب: OO96654.4.3.2.1.4.5.5