Asap!
(02.03 mc)
triangle adb, point c lies on segment ab and forms segment cd,...
Mathematics, 18.12.2019 20:31, jessie6516
Asap!
(02.03 mc)
triangle adb, point c lies on segment ab and forms segment cd, segment ac is congruent to segment bc. point a is labeled jungle gym and point b is labeled monkey bars.
beth is planning a playground and has decided to place the swings in such a way that they are the same distance from the jungle gym and the monkey bars. if beth places the swings at point d, how could she prove that point d is equidistant from the jungle gym and monkey bars?
if segment ad ≅ segment cd, then point d is equidistant from points a and b because congruent parts of congruent triangles are congruent.
if segment ad ≅ segment cd, then point d is equidistant from points a and b because a point on a perpendicular bisector is equidistant from the endpoints of the segment it intersects.
if m∠acd = 90° then point d is equidistant from points a and b because congruent parts of congruent triangles are congruent.
if m∠acd = 90° then point d is equidistant from points a and b because a point on a perpendicular bisector is equidistant from the endpoints of the segment it intersects.
Answers: 2
Mathematics, 21.06.2019 19:00, mustafajibawi1
Eis the midpoint of line segment ac and bd also line segment ed is congruent to ec prove that line segment ae is congruent to line segment be
Answers: 3
Mathematics, 22.06.2019 04:00, hobbs4ever1
What is the measure of ba (the minor arc) in the diagram below?
Answers: 3
Mathematics, 22.06.2019 04:30, glocurlsprinces
Consider the linear model for a two-stage nested design with b nested in a as given below. yijk=\small \mu + \small \taui + \small \betaj(i) + \small \varepsilon(ij)k , for i=1,; j= ; k=1, assumption: \small \varepsilon(ij)k ~ iid n (0, \small \sigma2) ; \small \taui ~ iid n(0, \small \sigmat2 ); \tiny \sum_{j=1}^{b} \small \betaj(i) =0; \small \varepsilon(ij)k and \small \taui are independent. using only the given information, derive the least square estimator of \small \betaj(i) using the appropriate constraints (sum to zero constraints) and derive e(msb(a) ).
Answers: 2
Mathematics, 04.06.2021 19:10
English, 04.06.2021 19:10
Biology, 04.06.2021 19:10
Physics, 04.06.2021 19:10
Mathematics, 04.06.2021 19:10