Have an account?
No student devices needed. Know more
12 questions
A(3,1) B(-2,-1) written correctly is:
(−2−3)2 + (−1−1)2\sqrt{\left(-2-3\right)^2\ +\ \left(-1-1\right)^2}(−2−3)2 + (−1−1)2
(1−3)2 + (−1−2)2\sqrt{\left(1-3\right)^2\ +\ \left(-1-2\right)^2}(1−3)2 + (−1−2)2
(−2−3)2 − (−1−1)2\sqrt{\left(-2-3\right)^2\ -\ \left(-1-1\right)^2}(−2−3)2 − (−1−1)2
A(2,0) B(-2,4) is written as
d = (4−2)2 − (0−2)2d\ =\ \sqrt{\left(4-2\right)^2\ -\ \left(0-2\right)^2}d = (4−2)2 − (0−2)2
d = (4−0)2 − (−2−2)2d\ =\ \sqrt{\left(4-0\right)^2\ -\ \left(-2-2\right)^2}d = (4−0)2 − (−2−2)2
d = (−2 +0)2 + (4+2)2d\ =\ \sqrt{\left(-2\ +0\right)^2\ +\ \left(4+2\right)^2}d = (−2 +0)2 + (4+2)2
d = (−2−2)2 + (4−0)2d\ =\ \sqrt{\left(-2-2\right)^2\ +\ \left(4-0\right)^2}d = (−2−2)2 + (4−0)2
How is AB written in the distance formula?
d = (5−3)2 + (0−−2)2d\ =\ \sqrt{\left(5-3\right)^2\ +\ \left(0--2\right)^2}d = (5−3)2 + (0−−2)2
d = (2−5)2 + (3 −0)2d\ =\ \sqrt{\left(2-5\right)^2\ +\ \left(3\ -0\right)^2}d = (2−5)2 + (3 −0)2
d = (5−3)2 − (0−−2)2d\ =\ \sqrt{\left(5-3\right)^2\ -\ \left(0--2\right)^2}d = (5−3)2 − (0−−2)2
d = (4−3)2 − (2−4)2d\ =\ \sqrt{\left(4-3\right)^2\ -\ \left(2-4\right)^2}d = (4−3)2 − (2−4)2
Explore all questions with a free account
Continue with Google
Continue with Microsoft
Continue with email
Continue with phone