Lecture8Worksheet
... 2. Using lookfor, find the built-in function in Matlab to determine if an integer is prime. (Hard: Can you write a function that does this yourself?) 3. Using the function you found in the previous question, write a function primepi that takes as input x and as output returns the number of primes th ...
... 2. Using lookfor, find the built-in function in Matlab to determine if an integer is prime. (Hard: Can you write a function that does this yourself?) 3. Using the function you found in the previous question, write a function primepi that takes as input x and as output returns the number of primes th ...
EXERCISE SET 1: MAGIC SQUARES The objective of these
... 4. Show that the degree of the polynomial function hB (n) is no greater than (m − 1)2 . Hint: Don’t work too hard – the explanation is actually quite simple. Project. The approach outlined above can be followed somewhat farther. First, it should be clear that the system (2) can, in principle, be sol ...
... 4. Show that the degree of the polynomial function hB (n) is no greater than (m − 1)2 . Hint: Don’t work too hard – the explanation is actually quite simple. Project. The approach outlined above can be followed somewhat farther. First, it should be clear that the system (2) can, in principle, be sol ...
1 - silverleafmath
... Rational Numbers • Counting Numbers are only positive integers • Whole Numbers: Counting Numbers + 0 • Integers: Whole Numbers + negative integers (which is …-3, -2, -1) • Rational Numbers: terminating or repeating decimals. • Real Numbers that can’t be written as a ration of two integers ...
... Rational Numbers • Counting Numbers are only positive integers • Whole Numbers: Counting Numbers + 0 • Integers: Whole Numbers + negative integers (which is …-3, -2, -1) • Rational Numbers: terminating or repeating decimals. • Real Numbers that can’t be written as a ration of two integers ...
MATH 114 W09 Quiz 1 Solutions 1 1. a) Find the domain of the
... Bonus Suppose f and g are odd functions. What can one say about f ◦ g? Solution: f ◦g is odd. To see this, we have f ◦g(−x) = f (g(−x)) = f (−g(x)) (since g is odd). Also, f (−g(x)) = −f (g(x)) = −f ◦ g(x) (since f is odd). Therefore, f ◦ g(−x) = −f ◦ g(x) and f ◦ g is odd. ...
... Bonus Suppose f and g are odd functions. What can one say about f ◦ g? Solution: f ◦g is odd. To see this, we have f ◦g(−x) = f (g(−x)) = f (−g(x)) (since g is odd). Also, f (−g(x)) = −f (g(x)) = −f ◦ g(x) (since f is odd). Therefore, f ◦ g(−x) = −f ◦ g(x) and f ◦ g is odd. ...
1.2A Notes
... (-2, 5) and is perpendicular to 4x – 3y = 10. 2. Write the equation of a line that passes through (-1, 7) and is parallel to y = 3. 3. In 1991, there were 57 million cats as pets in the US. By 1998, this number was 61 million. Write a linear model for the number of cats as pets. Then use the model t ...
... (-2, 5) and is perpendicular to 4x – 3y = 10. 2. Write the equation of a line that passes through (-1, 7) and is parallel to y = 3. 3. In 1991, there were 57 million cats as pets in the US. By 1998, this number was 61 million. Write a linear model for the number of cats as pets. Then use the model t ...
