topic 2: parallelograms
14. if ebcd is a parallelogram, eb = 16, ed = 25, bf = 11, ec = 34, m∠bed = 55°, m∠cdb = 67°, and m∠bce = 24°, find each missing measure.
bc = ______ m∠edc = ______
bd = ______ m∠ebd = ______
fc = ______ m∠bec = ______
cd = ______ m∠dbc = ______

15. find m∠n.
16. find m∠r.

17. in parallelogram abcd, if ed = 7x - 13 and bd = 16x - 38, find bd.

topic 3: rectangles
18. if abcd is a rectangle, ad = 9, ac = 22, and m∠bca = 66°, find each missing measure.
bc = ______ m∠adc = ______
ab = ______ m∠bac = ______
bd = ______ m∠cdb = ______
ec = ______ m∠aeb = ______

19. if pqrs is a rectangle, pr = 9x + 1, and qs = 13x - 11, find tr.
20. if defg is a rectangle, m∠deg = (4x - 5)°, and m∠fge = (6x - 21)°, find m∠dge.

Question

topic 2: parallelograms
14. if ebcd is a parallelogram, eb = 16, ed = 25, bf = 11, ec = 34, m∠bed = 55°, m∠cdb = 67°, and m∠bce = 24°, find each missing measure.
bc = ______  m∠edc = ______
bd = ______  m∠ebd = ______
fc = ______  m∠bec = ______
cd = ______  m∠dbc = ______

15. find m∠n.
16. find m∠r.

17. in parallelogram abcd, if ed = 7x - 13 and bd = 16x - 38, find bd.

topic 3: rectangles
18. if abcd is a rectangle, ad = 9, ac = 22, and m∠bca = 66°, find each missing measure.
bc = ______  m∠adc = ______
ab = ______  m∠bac = ______
bd = ______  m∠cdb = ______
ec = ______  m∠aeb = ______

19. if pqrs is a rectangle, pr = 9x + 1, and qs = 13x - 11, find tr.
20. if defg is a rectangle, m∠deg = (4x - 5)°, and m∠fge = (6x - 21)°, find m∠dge.

Accepted Answer

### Problem 14
# Explanation:
## Step1: Use parallelogram side property
In parallelogram $EBCD$, $BC=ED$, $CD=EB$.
$BC=25$, $CD=16$
## Step2: Use diagonal bisector property
Diagonals bisect each other: $BD=2	imes EB=2	imes16=32$; $FC=EC-BF=34-11=23$
## Step3: Find $\angle EDC$
$\angle EDC=\angle BED=55^\circ$ (alternate interior angles)
## Step4: Find $\angle EBD$
$\angle EBD=\angle CDB=67^\circ$ (alternate interior angles)
## Step5: Calculate $\angle BEC$
In $	riangle BCE$, $\angle BEC=180^\circ-\angle EBC-\angle BCE$. $\angle EBC=\angle EBD+\angle DBC$, first find $\angle DBC=\angle BED=55^\circ$ (alternate interior angles), so $\angle EBC=67^\circ+55^\circ=122^\circ$. $\angle BEC=180^\circ-122^\circ-24^\circ=34^\circ$
## Step6: Calculate $\angle DBC$
$\angle DBC=\angle BED=55^\circ$ (alternate interior angles)
# Answer:
$BC=25$, $BD=32$, $FC=23$, $CD=16$
$\angle EDC=55^\circ$, $\angle EBD=67^\circ$, $\angle BEC=34^\circ$, $\angle DBC=55^\circ$

---

### Problem 15
# Explanation:
## Step1: Set parallel angles equal
In parallelogram $KLMN$, consecutive angles are supplementary: $(8x+17)+(12x-39)=180$
## Step2: Solve for $x$
$20x-22=180 \implies 20x=202 \implies x=10.1$
## Step3: Find $\angle N$
$\angle N=\angle L=8x+17=8	imes10.1+17=80.8+17=97.8^\circ$
# Answer:
$\angle N=97.8^\circ$

---

### Problem 16
# Explanation:
## Step1: Set parallel angles equal
In parallelogram $RSTU$, alternate interior angles: $5x-8=14x-4$
## Step2: Solve for $x$
$-9x=4 \implies x=-\frac{4}{9}$ (Note: This indicates a typo, assuming $14x-41$ instead: $5x-8=14x-41 \implies 9x=33 \implies x=\frac{11}{3}$)
## Step3: Find $\angle R$
$\angle R=180^\circ-(5x-8)=180^\circ-(5	imes\frac{11}{3}-8)=180^\circ-(\frac{55}{3}-\frac{24}{3})=180^\circ-\frac{31}{3}=169.67^\circ$
(Using corrected problem: if $14x-41$, $\angle R=169.67^\circ$; original problem has invalid $x$, so assuming typo correction)
# Answer:
$\angle R=169.7^\circ$ (rounded)

---

### Problem 17
# Explanation:
## Step1: Use diagonal bisector property
In parallelogram $ABCD$, $BD=2	imes ED$
## Step2: Set up equation
$16x-38=2(7x-13)$
## Step3: Solve for $x$
$16x-38=14x-26 \implies 2x=12 \implies x=6$
## Step4: Calculate $BD$
$BD=16	imes6-38=96-38=58$
# Answer:
$BD=58$

---

### Problem 18
# Explanation:
## Step1: Use rectangle side property
In rectangle $ABCD$, $BC=AD=9$, $\angle ADC=90^\circ$
## Step2: Calculate $AB$
Use Pythagoras: $AB=\sqrt{AC^2-AD^2}=\sqrt{22^2-9^2}=\sqrt{484-81}=\sqrt{403}\approx20.07$
## Step3: Diagonal property
$BD=AC=22$, $EC=\frac{AC}{2}=11$
## Step4: Find $\angle BAC$
$\angle BAC=90^\circ-\angle BCA=90^\circ-66^\circ=24^\circ$
## Step5: Find $\angle CDB$
$\angle CDB=\angle BAC=24^\circ$ (alternate interior angles)
## Step6: Find $\angle AEB$
$\angle AEB=180^\circ-2\angle BAC=180^\circ-48^\circ=132^\circ$
# Answer:
$BC=9$, $AB\approx20.07$, $BD=22$, $EC=11$
$\angle ADC=90^\circ$, $\angle BAC=24^\circ$, $\angle CDB=24^\circ$, $\angle AEB=132^\circ$

---

### Problem 19
# Explanation:
## Step1: Rectangle diagonal property
In rectangle $PQRS$, $PR=QS$
## Step2: Set up equation
$9x+1=13x-11$
## Step3: Solve for $x$
$4x=12 \implies x=3$
## Step4: Calculate $TR$
$PR=9	imes3+1=28$, $TR=\frac{PR}{2}=14$
# Answer:
$TR=14$

---

### Problem 20
# Explanation:
## Step1: Rectangle diagonal angle property
$\angle DEG+\angle FGE=90^\circ$ (since diagonals form right angles at intersection for angle sum)
## Step2: Set up equation
$(4x-5)+(6x-21)=90$
## Step3: Solve for $x$
$10x-26=90 \implies 10x=116 \implies x=11.6$
## Step4: Find $\angle DGE$
$\angle DGE=\angle DEG=4x-5=4	imes11.6-5=46.4-5=41.4^\circ$ (alternate interior angles)
# Answer:
$\angle DGE=41.4^\circ$

Sovi.AI - AI Math Tutor

QUESTION IMAGE

Question

Explanation:

Problem 14

Step1: Use parallelogram side property

Step2: Use diagonal bisector property

Step3: Find $\angle EDC$

Step4: Find $\angle EBD$

Step5: Calculate $\angle BEC$

Step6: Calculate $\angle DBC$

Step1: Set parallel angles equal

Step2: Solve for $x$

Step3: Find $\angle N$

Step1: Set parallel angles equal

Step2: Solve for $x$

Step3: Find $\angle R$

Answer:

Problem 15