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Prove that if ab equals ba and bc equals cb then ac equals ca?
Given that ab = ba and bc = cb We can arrive at abbc = cbba by adding equal quantities to both sides of the equation By the cancellation law you're allowed to drop the bb from both sides of the equation to end up with ac = ca
To the nearest degree find the measure of angle b in triangle abc given measure of angle a equals 48degrees ac equals 62cm and ab equals 61cm?
67 degrees
How do you prove that x and y are directly proportional with the equation Y equals 8X-3?
11
Line be is the bisector of segment ac if ab equals 7 ac equals?
14
If triangle AC equals 6 and BD equals 4 find AB?
If AC equals 6 and BD equals 4, then AB equals 5.
In triangle abc given that angle a equals 57 angle b equals 73 and ab equals 24cm find the length of ac?
The sum of the angles inside a triangle is equal to 180°. We are told that angle a is 57°, and that angle b is 73°. This tells us that angle c is is (180 - 57 - 73)°, or 50°. We are also given the length of side ab, 25cm. With that, we can use the sine rule to calculate the length of side ac: sin(b) / |ac| = sin(c) / |ab| ∴ sin(73°) / |ac| = sin(50°) / 24cm ∴ |ac| = 24cm · sin(73°) / sin(50°) ∴ |ac| ≈ 29.96cm
If ab plus bc equals ac then ac equals ab plus bc?
yes because ab plus bc is ac
If ac plus cb equals ab and ac equals cb then the point c is?
the midpoint of AB.
If AB equals 5 and BC equals 8 then AC equals?
ac is 7 if b is 3 and a is 2 a nd c is 5
Abcd is a semi-circle with a diameter ab p is the point of intersection of ac and bd prove that ap times ac plus dp times db equals ac2?
In the given semi-circle ABCD with diameter AB, let P be the intersection of lines AC and BD. By applying the Power of a Point theorem, we can establish that ( AP \cdot PC + DP \cdot PB = AC^2 ). This is derived from the properties of cyclic quadrilaterals and the relationships between the segments formed by the intersecting chords within the circle. Thus, we conclude that ( AP \cdot AC + DP \cdot DB = AC^2 ).
Ac equals 16m and ab equals what m?
8line2
What is the length of the hypotenuse of the right triangle if AC equals 6 and AD equals 5?
The length of the hypotenuse of a right triangle if AC equals 6 and AD equals 5 is: 7.81
