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Question
2/2 rectangles, rhombus, squares practice day
- if pqrs is a rectangle, st = 12, and ( mangle prs = 23^circ ), find each measure.
a) ( sq = )
b) ( pr = )
c) ( mangle qpr = )
d) ( mangle psr = )
e) ( mangle sqr = )
f) ( mangle ptq = )
Step1: Find length of SQ
In a rectangle, diagonals bisect each other, so $SQ = 2 \times ST$.
$SQ = 2 \times 12 = 24$
Step2: Find length of PR
In a rectangle, diagonals are congruent, so $PR = SQ$.
$PR = 24$
Step3: Find $m\angle QPR$
Alternate interior angles are equal, so $m\angle QPR = m\angle PRS$.
$m\angle QPR = 23^\circ$
Step4: Find $m\angle PSR$
All angles in a rectangle are right angles.
$m\angle PSR = 90^\circ$
Step5: Find $m\angle SQR$
First, $m\angle SRQ = 90^\circ$, so $m\angle SQR = 90^\circ - m\angle PRS$.
$m\angle SQR = 90^\circ - 23^\circ = 67^\circ$
Step6: Find $m\angle PTQ$
$\angle PTR$ and $\angle PRS$ form a triangle, so $m\angle PTR = 180^\circ - 2\times23^\circ = 134^\circ$. $\angle PTQ$ is supplementary to $\angle PTR$.
$m\angle PTQ = 180^\circ - 134^\circ = 46^\circ$
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a) $SQ = 24$
b) $PR = 24$
c) $m\angle QPR = 23^\circ$
d) $m\angle PSR = 90^\circ$
e) $m\angle SQR = 67^\circ$
f) $m\angle PTQ = 46^\circ$