1) $\frac{x - 9}{10} = \frac{7}{4}$\
2) $\frac{9}{r - 10} = \frac{4}{6}$\
3) $\frac{10}{9} = \frac{m + 8}{5}$\
4) $\frac{10}{k - 5} = \frac{7}{9}$\
5) $\frac{4}{8} = \frac{7}{k - 5}$\
6) $\frac{7}{3} = \frac{p + 10}{8}$\
7) $\frac{4}{10} = \frac{8}{r + 1}$\
8) $\frac{a - 8}{6} = \frac{7}{5}$\
9) $\frac{8}{b - 2} = \frac{4}{3}$\
10) $\frac{x + 5}{3} = \frac{9}{6}$\
11) $\frac{5}{m - 3} = \frac{6}{m - 5}$\
12) $\frac{p + 10}{p + 7} = \frac{4}{9}$\
13) $\frac{6}{5} = \frac{a - 9}{a + 2}$\
14) $\frac{5}{v + 7} = \frac{7}{v - 2}$\
15) $\frac{m - 4}{m + 8} = \frac{2}{9}$\
16) $\frac{x - 10}{9} = \frac{x - 6}{4}$\
17) $\frac{k + 4}{6} = \frac{k + 1}{7}$\
18) $\frac{v - 8}{v - 7} = \frac{4}{10}$\
19) $\frac{6}{n - 5} = \frac{5}{n + 9}$\
20) $\frac{8}{r - 9} = \frac{10}{r + 6}$

Question

Accepted Answer

# Explanation:
## 1) Step1: Cross-multiply to eliminate fractions
$4(x-9)=7	imes10$
## 1) Step2: Simplify both sides
$4x-36=70$
## 1) Step3: Isolate $4x$
$4x=70+36$
$4x=106$
## 1) Step4: Solve for $x$
$x=\frac{106}{4}=\frac{53}{2}$

---
## 2) Step1: Cross-multiply to eliminate fractions
$9	imes6=4(r-10)$
## 2) Step2: Simplify both sides
$54=4r-40$
## 2) Step3: Isolate $4r$
$4r=54+40$
$4r=94$
## 2) Step4: Solve for $r$
$r=\frac{94}{4}=\frac{47}{2}$

---
## 3) Step1: Cross-multiply to eliminate fractions
$10	imes5=9(m+8)$
## 3) Step2: Simplify both sides
$50=9m+72$
## 3) Step3: Isolate $9m$
$9m=50-72$
$9m=-22$
## 3) Step4: Solve for $m$
$m=-\frac{22}{9}$

---
## 4) Step1: Cross-multiply to eliminate fractions
$10	imes9=7(k-5)$
## 4) Step2: Simplify both sides
$90=7k-35$
## 4) Step3: Isolate $7k$
$7k=90+35$
$7k=125$
## 4) Step4: Solve for $k$
$k=\frac{125}{7}$

---
## 5) Step1: Cross-multiply to eliminate fractions
$4(k-5)=7	imes8$
## 5) Step2: Simplify both sides
$4k-20=56$
## 5) Step3: Isolate $4k$
$4k=56+20$
$4k=76$
## 5) Step4: Solve for $k$
$k=19$

---
## 6) Step1: Cross-multiply to eliminate fractions
$7	imes8=3(p+10)$
## 6) Step2: Simplify both sides
$56=3p+30$
## 6) Step3: Isolate $3p$
$3p=56-30$
$3p=26$
## 6) Step4: Solve for $p$
$p=\frac{26}{3}$

---
## 7) Step1: Cross-multiply to eliminate fractions
$4(r+1)=8	imes10$
## 7) Step2: Simplify both sides
$4r+4=80$
## 7) Step3: Isolate $4r$
$4r=80-4$
$4r=76$
## 7) Step4: Solve for $r$
$r=19$

---
## 8) Step1: Cross-multiply to eliminate fractions
$5(a-8)=7	imes6$
## 8) Step2: Simplify both sides
$5a-40=42$
## 8) Step3: Isolate $5a$
$5a=42+40$
$5a=82$
## 8) Step4: Solve for $a$
$a=\frac{82}{5}$

---
## 9) Step1: Cross-multiply to eliminate fractions
$8	imes3=4(b-2)$
## 9) Step2: Simplify both sides
$24=4b-8$
## 9) Step3: Isolate $4b$
$4b=24+8$
$4b=32$
## 9) Step4: Solve for $b$
$b=8$

---
## 10) Step1: Cross-multiply to eliminate fractions
$6(x+5)=9	imes3$
## 10) Step2: Simplify both sides
$6x+30=27$
## 10) Step3: Isolate $6x$
$6x=27-30$
$6x=-3$
## 10) Step4: Solve for $x$
$x=-\frac{1}{2}$

---
## 11) Step1: Cross-multiply to eliminate fractions
$5(m-5)=6(m-3)$
## 11) Step2: Expand both sides
$5m-25=6m-18$
## 11) Step3: Isolate $m$
$6m-5m=-25+18$
$m=-7$

---
## 12) Step1: Cross-multiply to eliminate fractions
$9(p+10)=4(p+7)$
## 12) Step2: Expand both sides
$9p+90=4p+28$
## 12) Step3: Isolate $5p$
$9p-4p=28-90$
$5p=-62$
## 12) Step4: Solve for $p$
$p=-\frac{62}{5}$

---
## 13) Step1: Cross-multiply to eliminate fractions
$6(a+2)=5(a-9)$
## 13) Step2: Expand both sides
$6a+12=5a-45$
## 13) Step3: Isolate $a$
$6a-5a=-45-12$
$a=-57$

---
## 14) Step1: Cross-multiply to eliminate fractions
$5(v-2)=7(v+7)$
## 14) Step2: Expand both sides
$5v-10=7v+49$
## 14) Step3: Isolate $-2v$
$7v-5v=-10-49$
$2v=-59$
## 14) Step4: Solve for $v$
$v=-\frac{59}{2}$

---
## 15) Step1: Cross-multiply to eliminate fractions
$9(m-4)=2(m+8)$
## 15) Step2: Expand both sides
$9m-36=2m+16$
## 15) Step3: Isolate $7m$
$9m-2m=16+36$
$7m=52$
## 15) Step4: Solve for $m$
$m=\frac{52}{7}$

---
## 16) Step1: Cross-multiply to eliminate fractions
$4(x-10)=9(x-6)$
## 16) Step2: Expand both sides
$4x-40=9x-54$
## 16) Step3: Isolate $-5x$
$9x-4x=-40+54$
$5x=14$
## 16) Step4: Solve for $x$
$x=\frac{14}{5}$

---
## 17) Step1: Cross-multiply to eliminate fractions
$7(k+4)=6(k+1)$
## 17) Step2: Expand both sides
$7k+28=6k+6$
## 17) Step3: Isolate $k$
$7k-6k=6-28$
$k=-22$

---
## 18) Step1: Cross-multiply to eliminate fractions
$10(v-8)=4(v-7)$
## 18) Step2: Expand both sides
$10v-80=4v-28$
## 18) Step3: Isolate $6v$
$10v-4v=-28+80$
$6v=52$
## 18) Step4: Solve for $v$
$v=\frac{26}{3}$

---
## 19) Step1: Cross-multiply to eliminate fractions
$6(n+9)=5(n-5)$
## 19) Step2: Expand both sides
$6n+54=5n-25$
## 19) Step3: Isolate $n$
$6n-5n=-25-54$
$n=-79$

---
## 20) Step1: Cross-multiply to eliminate fractions
$8(r+6)=10(r-9)$
## 20) Step2: Expand both sides
$8r+48=10r-90$
## 20) Step3: Isolate $-2r$
$10r-8r=48+90$
$2r=138$
## 20) Step4: Solve for $r$
$r=69$

# Answer:
1) $x=\frac{53}{2}$
2) $r=\frac{47}{2}$
3) $m=-\frac{22}{9}$
4) $k=\frac{125}{7}$
5) $k=19$
6) $p=\frac{26}{3}$
7) $r=19$
8) $a=\frac{82}{5}$
9) $b=8$
10) $x=-\frac{1}{2}$
11) $m=-7$
12) $p=-\frac{62}{5}$
13) $a=-57$
14) $v=-\frac{59}{2}$
15) $m=\frac{52}{7}$
16) $x=\frac{14}{5}$
17) $k=-22$
18) $v=\frac{26}{3}$
19) $n=-79$
20) $r=69$

QUESTION IMAGE

Question

Explanation:

1) Step1: Cross-multiply to eliminate fractions

1) Step2: Simplify both sides

1) Step3: Isolate $4x$

1) Step4: Solve for $x$

2) Step1: Cross-multiply to eliminate fractions

2) Step2: Simplify both sides

2) Step3: Isolate $4r$

2) Step4: Solve for $r$

3) Step1: Cross-multiply to eliminate fractions

3) Step2: Simplify both sides

3) Step3: Isolate $9m$

3) Step4: Solve for $m$

4) Step1: Cross-multiply to eliminate fractions

4) Step2: Simplify both sides

4) Step3: Isolate $7k$

4) Step4: Solve for $k$

5) Step1: Cross-multiply to eliminate fractions

5) Step2: Simplify both sides

5) Step3: Isolate $4k$

5) Step4: Solve for $k$

6) Step1: Cross-multiply to eliminate fractions

6) Step2: Simplify both sides

6) Step3: Isolate $3p$

6) Step4: Solve for $p$

7) Step1: Cross-multiply to eliminate fractions

7) Step2: Simplify both sides

7) Step3: Isolate $4r$

7) Step4: Solve for $r$

8) Step1: Cross-multiply to eliminate fractions

8) Step2: Simplify both sides

8) Step3: Isolate $5a$

8) Step4: Solve for $a$

9) Step1: Cross-multiply to eliminate fractions

9) Step2: Simplify both sides

9) Step3: Isolate $4b$

9) Step4: Solve for $b$

10) Step1: Cross-multiply to eliminate fractions

10) Step2: Simplify both sides

10) Step3: Isolate $6x$

10) Step4: Solve for $x$

11) Step1: Cross-multiply to eliminate fractions

11) Step2: Expand both sides

11) Step3: Isolate $m$

12) Step1: Cross-multiply to eliminate fractions

12) Step2: Expand both sides

12) Step3: Isolate $5p$

12) Step4: Solve for $p$

13) Step1: Cross-multiply to eliminate fractions

13) Step2: Expand both sides

13) Step3: Isolate $a$

14) Step1: Cross-multiply to eliminate fractions

14) Step2: Expand both sides

14) Step3: Isolate $-2v$

14) Step4: Solve for $v$

15) Step1: Cross-multiply to eliminate fractions

15) Step2: Expand both sides

15) Step3: Isolate $7m$

15) Step4: Solve for $m$

16) Step1: Cross-multiply to eliminate fractions

16) Step2: Expand both sides

16) Step3: Isolate $-5x$

16) Step4: Solve for $x$

17) Step1: Cross-multiply to eliminate fractions

17) Step2: Expand both sides

17) Step3: Isolate $k$

18) Step1: Cross-multiply to eliminate fractions

18) Step2: Expand both sides

18) Step3: Isolate $6v$

Answer: