Identify the hypothesis and the conclusion in each of the following conditional
ID: 3077453 • Letter: I
Question
Identify the hypothesis and the conclusion in each of the following conditional statements. Then rewrite the statement in the form if ....then...a) if the function f is differentiable then it is continuos
b0 The square of the integer n is odd only if n is odd
c) For a function g to be integrable its is sufficient that g be continuos
d) That the triangle ABC is isosceles implies that two of the angles of triangles ABC are
congruent
e) An integer n is divisible by ten if the rightmost digit of n is a zero
f) For the integer m to be greater than the integer n it is neccesary that m-n be greater than
zero.
Explanation / Answer
a) if the function f is differentiable then it is continuos b) if n is odd then the square of the integer n is odd c) if a function g is continuos then g is integrable d)if the triangle ABC is isosceles then the two of the angles of triangles ABC are congruent e) if the rightmost digit of an integer n is a zero then n is divisible by ten f)For integer and integer n,if m-n is greater than zero then m is greater than n.