Homework Answers
a) A binomial is an expression which contain two terms. Example: 3x-2y
b) A number is a perfect square if it is square of some whole number. Example: 25 (i.e. 5²)
c) An order pair is of the form (x, y). Example: (-1,3)
d) An integer is collection of natural numbers its negative together with 0. Example: -5
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Provide an example of each of the following. a. a binomial: b. a perfect square: c....
Add the proper constant to each binomial so that the resulting trinomial is a perfect square...
Add the proper constant to each binomial so that the resulting trinomial is a perfect square trinomial. Then fa - N | نما O A. X2 OBY-(-) 00 .-(-3) OD.
5. An integer n is called a perfect square if it is the square of an...
5. An integer n is called a perfect square if it is the square of an integer, i.e., n = m2 for some integer m. a) Determine if 121 is a perfect square or not. b) Determine if pq3 is perfect square or not, where p and q are distinct primes.
// Use the following Project: Perfect Square Table A “Perfect Square Table” is a square...
// Use the following
Project: Perfect Square Table
A “Perfect Square Table” is a square of positive
integers such that the
sum of each row, column, and diagonal is the same
constant.
This program reads square tables from files, checks if
they are perfect squares,
and displays messages such as “This is a Perfect
Square Table with a constant of 34!”
or “This is not a Perfect Square Table”.
NAME:
IDE:
*/...
3. (4 points) Provide an example scenario of a binomial random variable that is related to...
3. (4 points) Provide an example scenario of a binomial random variable that is related to your area of work or interest (first, you need to describe your work or area of interest!) and explain clearly how each requirement for the binomial distribution is satisfied. You can use the following questions as guides to provide your example. - Describe briefly your work or area of interest. - Describe a situation related to your work or area of interest with a...
Parts a, b and c please! 10. For each of the following situations, provide an example...
Parts a, b and c please!
10. For each of the following situations, provide an example that meets the given requirements, or fully explain why such an example could not exist. a. A homogeneous linear system of equations with no solutions. Two matrices, A and B, such that AB = BA. [6 marks) b, 9, that is equal to its transpose. c. A 3x3 matrix A, with tr(B)
Describe the differences between the use of the binomial and Poisson distribution. Provide one example of...
Describe the differences between the use of the binomial and Poisson distribution. Provide one example of how each can be used and explain why you selected the example.
Provide an example that follows either the binomial or Poisson distribution, and explain why that example...
Provide an example that follows either the binomial or Poisson distribution, and explain why that example follows that particular distribution.
Explain the following terms. When indicated, also provide an example. (12 marks) a) Lazy Pair or...
Explain the following terms. When indicated, also provide an example. (12 marks) a) Lazy Pair or Inert Pair Effect (also provide an example) b) Diagonal relationship (also provide an example) c) Coordination compound d) Ionization isomer (also provide an example) e) Synergism or backbonding (also provide an example) f) Cooperativity effect
4. Write a logical function perfect Square that receives a positive integer number and checks if ...
write the code in C please
4. Write a logical function perfect Square that receives a positive integer number and checks if it is a perfect square or not. Note: perfect square numbers are 4, 9,16,25,36 etc.... Write a main function that makes use of the perfect Square function to find and print all perfect squares between nl and n2. nl and n2 are end values of a range introduced by the user. ■ (inactive CAT EXE) Enter end values...
Give an example for each of the following, or explain why no example exists. (a) A...
Give an example for each of the following, or explain why no example exists. (a) A non-diagonalisable (square) matrix. (b) A square matrix (having real entries) with no real eigenvalues. (c) A 2 x 2 matrix B such that B3 = A where A = (d) A diagonalisable matrix A such that A2 is not diagonalisable.
Add the proper constant to each binomial so that the resulting trinomial is a perfect square trinomial. Then fa - N | نما O A. X2 OBY-(-) 00 .-(-3) OD.
5. An integer n is called a perfect square if it is the square of an integer, i.e., n = m2 for some integer m. a) Determine if 121 is a perfect square or not. b) Determine if pq3 is perfect square or not, where p and q are distinct primes.
// Use the following
Project: Perfect Square Table
A “Perfect Square Table” is a square of positive
integers such that the
sum of each row, column, and diagonal is the same
constant.
This program reads square tables from files, checks if
they are perfect squares,
and displays messages such as “This is a Perfect
Square Table with a constant of 34!”
or “This is not a Perfect Square Table”.
NAME:
IDE:
*/...
Parts a, b and c please!
10. For each of the following situations, provide an example that meets the given requirements, or fully explain why such an example could not exist. a. A homogeneous linear system of equations with no solutions. Two matrices, A and B, such that AB = BA. [6 marks) b, 9, that is equal to its transpose. c. A 3x3 matrix A, with tr(B)
write the code in C please
4. Write a logical function perfect Square that receives a positive integer number and checks if it is a perfect square or not. Note: perfect square numbers are 4, 9,16,25,36 etc.... Write a main function that makes use of the perfect Square function to find and print all perfect squares between nl and n2. nl and n2 are end values of a range introduced by the user. ■ (inactive CAT EXE) Enter end values...
Give an example for each of the following, or explain why no example exists. (a) A non-diagonalisable (square) matrix. (b) A square matrix (having real entries) with no real eigenvalues. (c) A 2 x 2 matrix B such that B3 = A where A = (d) A diagonalisable matrix A such that A2 is not diagonalisable.
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