If A,B,C are the on a number line such that, d(A,B)=15, Cis the mid point on seg AB then d(A,C)= ______________ d(B,C)= __________________ And dA,B)= d(_____)+ d(______) *
Answers
Step-by-step explanation:
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ?
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ? d(A,B) = d(__) + d(__)
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ? d(A,B) = d(__) + d(__)
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ? d(A,B) = d(__) + d(__) Proof _______ d(A,C) = 1/2 × AB = d(A,C) = 1/2 × 15
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ? d(A,B) = d(__) + d(__) Proof _______ d(A,C) = 1/2 × AB = d(A,C) = 1/2 × 15 = d(A,C) = 1 × 7.5
Step-by-step explanation: Given ____d(A,B) = 15 and C is the mid point To Prove____d(A,C) = ? d(B,C) = ? d(A,B) = d(__) + d(__) Proof _______ d(A,C) = 1/2 × AB = d(A,C) = 1/2 × 15 = d(A,C) = 1 × 7.5 = d(A,C) = 7.5 = d(B,C) = ? = d(B,C) = 1/2 × 15 = d(B,C) = 1 × 7.5 = d(B,C) = 7.5 here we see that d(A,C) = d(B,C) = 7.5 hence, = d(A,B) = d(__) + d(__) = d(A,B) = d(A,C) + d(B,C)
here we see that d(A,C) = d(B,C) = 7.5 hence, = d(A,B) = d(__) + d(__) = d(A,B) = d(A,C) + d(B,C) d(A,B) = 7.5 + 7.5 = d (A,B) = 15