SOLUTION: Theres a parallelogram slanted to the right. (SRQP) M is in between SR and connects to the bottom right angle, angle Q, making MQ. T is in between PQ and connects up to the top lef
Algebra ->
Parallelograms
-> SOLUTION: Theres a parallelogram slanted to the right. (SRQP) M is in between SR and connects to the bottom right angle, angle Q, making MQ. T is in between PQ and connects up to the top lef
Log On
Question 135553This question is from textbook
: Theres a parallelogram slanted to the right. (SRQP) M is in between SR and connects to the bottom right angle, angle Q, making MQ. T is in between PQ and connects up to the top left angle, angle S. So the top of the shape is SMR, and the bottom is PTQ. Given: PQRS is a parallelagram and PT is congruent to RM. Prove TQMS is a parallelagram. by the way, the book is called course 2, integrated mathematics, 3rd edition. chapter 7, page 268, this one os problem 11 but if anyone knows problems 11-13 and 15 you would be awesomeeee=]
thankss.
PLEASE HELPPPP!!! This question is from textbook
(