Here students will read MTH603 Midterm MCQs as they want to read because you are searching on google and now you reach this post so please try to read complete this so that these MCQs can help you and other students for midterm exams preparation. But this file is not enough for midterm exams. You should also read MTH603 handouts properly if you want to get good marks in midterm exams. But students if you want to find a PDF of this MTH603 Midterm MCQs so please search on google  we hope you will find it if any students upload it on his website. So promoting online education for students helps therefore students read online these MTH603 MCQs without any disturbance. This is the MTH603 - Numerical Analysis MCQs for students help who have the MTH603 book and they want to read solved MCQs. Students these  are very helpful for you and for other students so please learn them and also read them before your exams we hope these MCQs will be helpful for your exams. Students Also Read MTH603 Quiz 1 Solution.
We Also Recommend |
MTH603 -Â Numerical Analysis MCQs |
| Post Title | MTH603 Midterm Solved MCQs |
| Book Code | MTH603 |
| Current/Past | Current MTH603 Solved MCQs |
| Mid/Final | MTH603 Midterm Solved MCQs |
| Also, Read | MTH301 Quiz 1 Solution |
| Also, Read | MTH304 Grand Quiz |
MTH603 Midterm Solved MCQs
Cholesky's reduction method is also called. (MTH603)
Crout's methodÂ
Bisection methodÂ
Regula falsi methodÂ
Muller methodÂ
There are ………….types of error. (MTH603)
2
4
5
3
Which method requires three starting points? (MTH603)
Muller methodÂ
Bisection methodÂ
Newton raphson methodÂ
Secant methodÂ
The statement, 7265 instead of 7269 lies in the category of: Â (MTH603)
Local round off errorÂ
Inherent error
Error of sumÂ
Local truncation errorÂ
The number of significant digits in the number of 608.030060 is. (MTH603)
6
8
9
7
The convergence of which of the following method is sensitive to starting value. (MTH603)
False positionÂ
Newton raphson methodÂ
Secant methodÂ
Gauss seidel methodÂ
The number system that has a base of 16 is called …………system. (MTH603)
Decimal
Octal
Binary
HexadecimalÂ
The number system that is used in our daily life is called ……….system. (MTH603)
Decimal
Octal
Binary
HexadecimalÂ
The number system that has a base 2 is called ….system. (MTH603)
BinaryÂ
Octal
Decimal
HexadecimalÂ
Which method requires three starting points? (MTH603)
Secant methodÂ
Bisection methodÂ
Muller methodÂ
Newton raphson methodÂ
The 2nd row of the augmented matrix of the system of linear equation is 2x+z=4, x-y+z=-3, -y+z=-5. (MTH603)
1,-1,0 and 3
1,-1,0 and -3
1,-1,0 and -5
1,-1,1 and -3Â
The number system that has a base 8 is called …….system. (MTH603)
Hexadecimal
Binary
Octal
Decimal
Which one of the following is a two points method? (MTH603)
Method of iterationÂ
Bullers methodÂ
Secant methodÂ
Newton raphson method
The root of the equation 3x-x2 = 0 is divided in the interval. (MTH603)
[0,1]
[-1,0]
[-2,-1]
[2,3]
3x4-2x2-24 = 0 has at least ………..complex root(s)? (MTH603)
3
2
4
1
Which method requires a derivative of the solution? Â (MTH603)
Bisection methodÂ
Regula falsi methodÂ
Muller methodÂ
Newton raphson methodÂ
The 2nd row of the augmented matrix of the system of linear equation is 2x+z=4 , x-y+z=-3 , -y+z=-5. (MTH603)
1,-1,0 and 3
1,-1,0 and -3
1,-1,0 and -5
1,-1,1 and -3Â
The difference between the rounded-off amount and the actual value is called. Â (MTH603)
Rounded off valueÂ
Estimated valueÂ
Inherent valueÂ
Rounding errorÂ
A series 16+B+4+2+1 is replaced by the series 16+8+4+2 then it is called. Â (MTH603)
Typing errorÂ
Local round off errorÂ
Inherent errorÂ
Local truncation errorÂ
Nonconvergence in the newton-raphson method can occur if the initial value is selected such that the derivative of the function equals to. Â (MTH603)
ZeroÂ
Negative infinityÂ
OneÂ
InfinityÂ
 |
MTH603 Midterm Solved MCQs |
Post a Comment