bugboyz
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I need help ASAP please! I'll give u brainiest if two or more people answer and a thanks!. (OOPS I ACCIDENTLY PUT THIS ON ENGLISH BUT ITS MATH LOL)

I need help ASAP please Ill give u brainiest if two or more people answer and a thanks OOPS I ACCIDENTLY PUT THIS ON ENGLISH BUT ITS MATH LOL class=

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Answer:

HL and ASA

Explanation:

Given that CB is perpendicular to AD at B between A and D, and 4BCA is congruent to BCD, with AC equal to DC, we can analyze the situation:

Right Angle (90 degrees): CB is perpendicular to AD at B. This indicates a right angle.

Angle-Side-Angle (ASA): Since 4BCA is congruent to BCD, this implies an angle (BCA or BCD), a side (BC), and another angle (B or D) are congruent.

Hypotenuse-Leg (HL): In a right-angled triangle, if the hypotenuse and one leg are congruent to the corresponding parts of another right-angled triangle, then the triangles are congruent.

Considering the right angle, the congruent angles, and the congruent side, we can use ASA and HL to conclude that the triangles AABC and DBC are congruent.

So, the correct answer is HL and ASA.

missingchromosone

!<Answer>!

The statement "CB is perpendicular to AD at B between A and D" describes a geometric relationship between the line segments CB and AD.

Here's a step-by-step explanation:

1. Perpendicular lines: The statement tells us that CB and AD are perpendicular to each other. In geometry, perpendicular lines intersect at a right angle, which is a 90-degree angle. This means that the angle formed at the point of intersection, which is point B in this case, measures 90 degrees.

2. Point B: The statement specifies that point B is the point of intersection between the line segments CB and AD. It is located between points A and D, indicating that point B lies on the line segment AD.

In summary, the statement tells us that CB and AD intersect at point B, forming a right angle (90-degree angle) at that point.

~ Sun

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