Answer: 196 m
Step-by-step explanation:
Answer: 3 x 13 ?
Step-by-step explanation:
Answer & Step-by-step explanation:
This can be proven with the SAS theorem (side-angle-side)
With a perpendicular bisector, the line it bisects is cut directly in half. This creates two equal sides:
and it creates two 90° angles:
∠
∠
And because of the reflexive property of congruence:
Side-Angle-Side.
:Done
C. −6, is the best option
Answer:
You didn't add a specific time frame so I can you a correct answer.
Explanation:
⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢀⣤⣄⠄⡀⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣴⣿⣿⣿⣿⣷⡒⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢀⡀⣹⣿⣿⣿⣿⣿⣯⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢀⣀⣀⣴⣿⣿⣿⣿⣿⣿⠿⠋⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⢀⣀⣤⣶⣾⠿⠿⠿⠿⣿⣿⣿⣿⣿⣿⣿⡇⠄⠄⠄⠄⠄⠄⠄ ⠄⡶⣶⡿⠛⠛⠉⠉⠄⠄⠄⠄⢸⣿⣿⣿⣿⣿⣿⣿⠃⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠘⠃⠄⠄⠄⠄⠄⠄⠄⠄⢠⣿⣿⣿⣿⣿⡟⠁⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⣤⣾⣷⣿⣿⣿⣿⡏⠁⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⢀⣠⣴⣾⣿⣿⣿⣿⣿⣿⣿⣿⠂⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⢀⣤⣴⣾⣿⣿⣿⣿⡿⠛⠻⣿⣿⣿⣿⡇⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠸⣿⣿⣿⣿⠋⠉⠄⠄⠄⠄⣼⣿⣿⡿⠇⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠈⠻⣿⣿⣆⠄⠄⠄⠄⠄⣿⣿⣿⣷⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠻⣿⣿⣆⡀⠄⠄⠈⠻⣿⣿⣿⣦⡄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⣀⣌⣿⣿⣿⣦⡄⠄⠄⠄⠙⠻⣿⣿⣦⣀⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠈⠉⠉⠉⠉⠉⠁⠄⠄⠄⠄⠄⠄⠄⠘⠻⣿⢿⢖⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠉⠉⠁⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⢠⣴⣧⣤⣴⡖⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⣰⣿⣿⣿⣿⣿⣷⣀⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⣿⣿⣿⣿⣿⣿⣿⣿⣷⣶⡄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠈⠘⠻⢿⣿⣿⣿⣿⣿⣿⣿⣆⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣰⣿⣿⣿⣿⣿⣿⣿⣿⣿⡆⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⢤⣴⣦⣄⣀⣀⣴⣿⡟⢿⣿⡿⣿⣿⣿⣿⣿⣿⡄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠉⠉⠙⠻⠿⣿⡿⠋⠄⠈⢀⣀⣠⣾⣿⣿⣿⣿⣿⡄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠾⣿⣿⣿⣿⣿⣿⣿⣿⣿⣿⣇⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⢀⣠⣴⣾⣿⣿⣿⣿⣿⣿⣿⣿⣿⣿⡏⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⣶⣿⣿⣿⣿⣿⣿⣿⣿⣿⡟⠉⠋⠉⠉⠁⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠈⠛⠛⣿⣿⣿⣿⣿⣿⣇⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⢀⣠⣶⣿⣿⠿⢛⣿⣿⣿⣿⣷⣤⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⣶⣷⣿⣿⡉⠄⠄⠄⠄⠉⠉⠉⠉⠉⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠘⠛⠟⢿⣤⣤⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢀⠄⣠⣶⣶⣷⣿⣶⡊⠄⠄⣀⣤⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⣀⣴⣶⣾⢿⣿⣿⣿⣿⣿⣿⣿⣿⣶⣿⣿⡏⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⢸⣿⡍⠁⠄⠈⢿⣿⣿⣿⣿⣿⣿⣿⣿⠿⠁⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣼⣿⣿⣿⣿⣿⣿⣿⠏⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣿⣿⣿⣿⣿⣿⣿⡿⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢸⣿⣿⣿⣿⣿⡿⠋⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠈⠻⣿⣿⣿⣿⣡⣶⣶⣄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⣀⣀⣠⣴⣦⡤⣿⣿⣿⣿⡻⣿⣿⡯⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⣿⣿⣿⣿⣿⣿⣷⣿⣿⣿⣿⣿⣿⡟⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⢻⣿⣿⡏⠉⠙⠛⢛⣿⣿⣿⣿⠟⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⢿⣿⡧⠄⠄⢠⣾⣿⣿⡿⠁⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠈⣿⣿⣄⣼⣿⣿⣿⠏⠁⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠸⡿⣻⣿⣿⣿⣿⣆⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⣿⣻⠟⠈⠻⢿⣿⣿⣆⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠿⠍⠄⠄⠄⠄⠉⠻⣿⣷⡤⣀⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠈⢻⣿⡿⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣿⡯⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠸⠃⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢀⣠⣶⣶⣤⡀⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣾⣿⣿⣿⣿⣿⡞⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣿⣿⣿⣿⣿⣿⡿⢃⡀⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠘⢿⣿⣿⣿⣿⣿⣿⣿⣧⡀⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢈⣽⣿⣿⣿⣿⣿⣿⣿⢿⣷⣦⣀⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣸⣿⣿⣿⣿⣿⣿⣿⣿⠄⢉⣻⣿⡇⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢠⣿⣿⡉⣀⣿⣿⣿⣿⣋⣴⣿⠟⠋⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠄⠄⣠⣴⣿⣿⣿⣿⣿⣿⣿⣿⣿⣿⣏⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠄⢀⣀⣼⣿⣿⣿⣿⣿⣿⠿⢿⣿⣿⣿⣿⣿⣮⡠⠄⠄⠄⠄ ⠄⠄⠄⠄⢰⣾⣿⣿⡿⠿⠛⠛⠛⠉⠄⠄⠄⠄⠙⠻⢿⣿⣿⣿⣶⣆⡀⠄ ⠄⠄⠄⠄⠄⠹⣿⣿⣦⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⢉⣿⣿⣿⣿⣿⠂ ⠄⠄⠄⠄⠄⠄⠈⢿⣿⣇⠄⠄⠄⠄⠄⠄⠄⠄⠄⠄⣴⣾⣿⡿⠟⠉⠄⠄ ⠄⠄⠄⠄⠄⠄⠄⠂⢿⣿⣥⡄⠄⠄⠄⠄⢀⣠⣶⣿⣿⠟⠋⠁⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⣀⣤⣾⣿⣿⣷⣿⣃⡀⢴⣿⣿⡿⣿⣍⠄⠄⠄⠄⠄⠄⠄⠄ ⠄⠄⠄⠄⠄⠈⠉⠉⠉⠉⠉⠉⠉⠄⠄⠄⠉⠙⠛⠛⠛⠛⠂⠄⠄⠄⠄⠄
