If WXYZ is a square, then all four sides are equal in length, meaning WX = XY = YZ = ZW. Additionally, each angle must measure 90 degrees, ensuring that the corners are right angles. The diagonals WX and YZ must also be equal in length and bisect each other at right angles. Finally, the diagonals should intersect at the midpoint of each diagonal.
In a square WXYZ, the following statements must be true: all sides are equal in length, each angle measures 90 degrees, and the diagonals bisect each other at right angles and are equal in length. Additionally, the diagonals also divide the square into two congruent triangles.
WY
If ( pq ) and ( qr ) are both true statements, then it follows that both ( p ) and ( q ) must be true (since ( pq ) is true) and both ( q ) and ( r ) must be true (since ( qr ) is true). Consequently, this implies that ( q ) is true in both cases. However, we cannot definitively conclude the truth values of ( p ) or ( r ) without additional information. Thus, the statements themselves do not inherently guarantee the truth of ( p ) or ( r ) alone.
True
If the statements "xy" and "yz" must be true, it implies that both products are non-zero. This suggests that both x and y must be non-zero for "xy" to hold, and both y and z must also be non-zero for "yz" to be true. Therefore, it can be concluded that y must be non-zero and that x and z can take any values as long as they do not contradict the conditions of the statements.
If WXYZ is a square, which statements must be true? Check all that apply: ANSWERS (apex): angle W is supplementary to angle Y. angle W is congruent to angle Y. angle W is a right angle. WXYZ is a parallelogram WX ≅ XY
To determine if CZ is a square, the following statements must be true: All four sides of CZ must be equal in length. All four angles of CZ must be right angles (90 degrees). The diagonals of CZ must be equal in length and bisect each other at right angles.
WY
The word "and" means both statements must be true. The word "or" means that at least one of the statements must be true.
Not necessarily. It will all depend on the statements A and B.
A voucher must be an accurate representation of a trip's itinerary, expenses, and daily allowances.
Yes, but the converse if a recangele must be a square and that is NOT true.
That depends what the statements are.
A covered entity must have an established complaint process
"F(x) is a bijective mapping" nust be true.
True
Oh, dude, if "jkl mnp," then the statements that must be true are probably the ones that make sense in the context of "jkl mnp." I mean, it's like saying if the sky is blue, then the grass is green, right? So, like, just look at the situation and use some good old common sense to figure out which statements are true.