sec. 2 Proof Flashcards
What are the 4 rules of proof?
Prove that the sum of any three odd numbers is odd.
Prove that the (n+3)2 - (n-2)2 ≡ 5(2n+1).
R says ‘’ the diff. between any two consecutive numbers square numbers is always a prime number ‘’.
Prove R is wrong.
Prove that the difference between 1018 and 621 is a multiple of two.
The range of a set of +ive numbers is 5. Each number in the set is doubled.
Show that the range of the new set of numbers also doubles.
Ellie says, ‘‘If x > y, then ‘‘x > y’’.
Is she correct? Explain your answer.
Prove that the sum of the ext. angles of a triangle is
360°
Prove that (n+3)2 - (3n+5) ≡ (n-3)(n+2)+2
Prove that (n-3)2 - (n-5) ≡ (n-3)(n-4)+2
Prove that 25 - (x-8)2/4 ≡ (2+x)(18-x)/4
Prove that if 3(ax + 7) - 2( x+b) ≡ 4x + 29, then a=2 and b=-4
Prove that (2n+1) - (2n-1) - 10 is not a multiple of 8 for +ive values of n.
Prove that the sum of any three consecutive numbers is divisible by 3
Prove that an even number multiplied by another even number will always result in an even number.
Prove that the sum of any three consecutive even numbers is always a multiple of six
Prove these statements:
a) The sum of any two consecutive odd numbers must always be a multiple of 4
b) The sum of the squares of any two consectice odd numbers cannot be a multiple of 4.
Maisie says ‘‘all pime numbers are odd.’’
Prove M is wrong.
2 is a prime number and it is even.
Prove that these statements are wrong:
a) If the sum of two integers is even, one of the integers must be even.
b) If n is an integer and n2 is divisible by 4, then n is also divisible by 4 .
C says ‘‘if a2=b2’’, then ‘‘a=b’’.
Prove that she is wrong.
Prove that 520 - 519 is even without using a calc.
Without using a calculator, prove the sum of 218 and
154 is a multiple of 3.
Without using a calculator, prove that 38 - 1 is not a prime number.
The nth term of a sequence is given by 1/2n - 5/2n+3.
Prove that the sum of any two consecutive numbers in a sequence is is a square no.
