Property 2 if ` p/q ` is a rational number and m is a common divisor of` ` p and q `then `p/q=(p-:m)/(q-:m)`

State whether the statements give are True or False. If (p)/(q) is a rational number and m is a non-zero common divisor of p and q, then (p)/(q) = (p div m)/( q div m)

Property 1 if (p)/(q) is a rational number and m is a non -zero integer then (p)/(q)=p xx(m)/(q)xx m

State whether the statements given are True or False. If (p)/(q) is a rational number and m is a non-zero integer, then (p)/(q) = (p xx m)/( q xx m)

State whether the statements given are True or False. If (p)/(q) is a rational number and m is a non-zero integer, then (p xx m)/( q xx m) is a rational number not equivalent to (p)/(q) .

If (p)/(q) is a rational number, then q cannot be ______.

If a is any real number and m;n are positive integers; then (a^(p))/(a^(q))=a^(p-q)

If a is any real number and m;n are positive integers; then a^(p)xx a^(q)=a^(p+q)

If a is any real number and m;n are positive integers; then (a^p)^q = a^(pq) = (a^q)^p

Is zero a rational number? Can you write it in the form (p)/(q) ,where p and q are integers and q!=0

In zero a rational number? Can you write it in the form (p)/(q), where p and q are integers and q!=0?