Statement I For each eal, there exists a pooint c in `[t,t+pi]` such that `f('c)`
Because
Statement II `f(t)=f(t+2pi)` for each real t .

let f(x)=2+cos x for all real x Statement 1: For each real t,there exists a pointc in [t,t+pi] such that f'(c)=0 Because statement 2:f(t)=f(t+2 pi) for each real t

Statement 1: If both functions f(t)a n dg(t) are continuous on the closed interval [1,b], differentiable on the open interval (a,b) and g^(prime)(t) is not zero on that open interval, then there exists some c in (a , b) such that (f^(prime)(c))/(g^(prime)(c))=(f(b)-f(a))/(g(b)-g(a)) Statement 2: If f(t)a n dg(t) are continuou and differentiable in [a, b], then there exists some c in (a,b) such that f^(prime)(c)=(f(b)-f(a))/(b-a)a n dg^(prime)(c)(g(b)-g(a))/(b-a) from Lagranes mean value theorem.

Statement 1 is True: Statement 2 is True; Statement 2 is a correct explanation for statement 1 Statement 1 is true, Statement 2 is true;2 Statement 2 not a correct explanation for statement 1. Statement 1 is true, statement 2 is false Statement 1 is false, statement 2 is true Statement I: If A is obtuse angle I A B C , then tanB\ t a n C<1 because Statement II: In A B C ,\ t a n A=(t a n B+t a n C)/(t a n B t a n C-1)\ a. A b. \ B c. \ C d. D

Write T against true and F against false in the statements. Like charges attract each other. (T/F)

Let T gt 0 be a fixed real number. Suppose f is a continuous function such that for all x in R . f(x+T)= f(x) . If I = int_(0)^(T)f(x) dx then the value of int_(3)^(3+3T) f(2x) dx is

Statements: B > A ≥ T > F = Y ≤ S Conclusions: F S

Statements: B > A ≥ T > F = Y ≤ S Conclusions: F S