1-4. True/False [1 point each] Write a T on the line if the statement is always...
For each statement, decide whether it is always true (T) or sometimes false (F) and write your answer clearly next to the letter before the statement. In this question, u and v are non-zero vectors in R"; W is a vector space, wi is a vector in W, and P2 is the vector space of polynomials of degree less than or equal to 2 with real coefficients. (a) The plane with normal vector u intersects every line with direction vector...
Indicate whether the following statement is true or false) In order to receive full credit, you must provide justification of your answer on the separate sheet you submit(e.g., a proof of a true statement, or a counterexample to a false statement). If f is a continuous function on a smooth curve C' in the xy-plane and Sc f(x, y) ds > 0, then f(x,y) > 0 for all points (x, y) in C. True False
Problem 1: Determine whether the statement is true or false. If the statement is true, then prove it. Otherwise, provide a counterexample. (a) If a continuous function f:R +R is bounded, then f'(2) exists for all x. (b) Suppose f.g are two functions on an interval (a, b). If both f + g and f - g are differentiable on (a, b), then both f and g are differentiable on (a,b). Problem 2: Define functions f,g: RR by: x sin(-),...
Determine whether each of the following is Always True, Sometimes True, or Always False. If the statement is Always True or Always False, provide a brief justification. If the statement is Sometimes True, provide an example of a series that makes it true and an example of a series that makes it false. In the following, {a_n}∞n=1 is a sequence and {s_n}∞n=1 refers to the corresponding sequence of partial sums. (a) If lim n→∞ s_n = 0, then lim n→∞...
10. TRUE or FALSE: Write TRUE if the statement is always true; otherwise, write FALSE. _a. {0} c{{0}, {{0}}} _b. Ø $ ({1, 2}), the power set of {1,2} c. If5<3 then 8 is an odd integer. d. The relation R = {(a,b), (b,a)} is symmetric but not transitive on the set X = {a,b}. e. The relation {(1,2), (2,2)} is a function from A={1,2} to B={1,2,3} _f. If the equivalence relation R = {(1,1), (2,2), (3,3), (4,4), (1,3), (3,1),...
(e) none of the above 6. True or false, 2 pts each. If the statement is ever false, circle false as your answer. No work is required, and no partial credit will be given. (a) f(a, b) points in the direction of greatest increase of f at (a,b). TRUE FALSE (b) If a and b are three-dimensional vectors, then so is a b. TRUE FALSE (C) For any two vectors a and b, a + b = a + bl....
1. Determine whether the statement is true or false. If false, explain why and correct the statement (T/FIf)exists, then lim ()f) o( T / F ) If f is continuous, then lim f(x) = f(r) (TFo)-L, then lim f(x)- lim F(x) "( T / F ) If lim -f(x)s lim. f(x) L, then lim f(x)s 1. "(T/F) lim. In x -oo . (T/F) lim0 ·(T / F ) The derivative f' (a) is the instantaneous rate of change of y...
6.) True or False Questions. If the statement is always true, write "True". If the statement is not always true, write "False" The heights of all normal distributions are the same. The normal distribution is an example of a continuous probability distribution We can use the CLT for all combinations of sample sizes and distributions A Confidence Interval is guaranteed to contain the true population parameter value As we increase sample size, the margin of error will decrease for a...
With justification in each one. Clarification; why if true and why if false? Please Determine whether the following statement is true or false: • Iff: R+R is differentiable and strictly increasing on R, then f'(1) > 0 VI ER • If S: R R is continuous and f(x) - ron Q, then (V3) - 3. • If f,g: (0,1) - Rare functions such that \S(1)-f(y) = g(1)-9(y) for all 1, y € (0, 1) and g is continuous on (0,1),...
(1 point) Are the following statements true or false? (1 point) Are the following statements true or false? v 1. If the vector fields F and Ğ Have ScĘ. dr = ScĞ. dr for a particular path C, then F=G. 2. The circulation of any vector field Ę around any closed curve C is zero. ? ? ? 3. If F = Vf, then F is conservative. 2 4. If ScĚ.dñ = 0 for one particular closed path, then F...