Simplify without the use of a calculator: $$ 9.1 \sin 330^{\circ}+\frac{\cos 250^{\circ}}{\sin 160^{\circ}} $$ $$ 9.2 \frac{\sin 120^{\circ} \cdot \cos 135^{\circ} \cdot an 240^{\circ}}{\cos 150^{\circ} \cdot an 150^{\circ} \cdot \sin 315^{\circ}} $$ $$ 9.3 \frac{1}{\sqrt{3}} \sin 120^{\circ}+\frac{1}{2} an 45^{\circ} \cos ^{2} 225^{\circ}-\frac{\sin 55^{\circ}}{\cos 145^{\circ}} $$ $$ 9.4 \frac{\sin ^{2} 300^{\circ}+\sin 240^{\circ} \cos 150^{\circ}}{ an 225^{\circ} \cdot \sin 270^{\circ}} $$ $$ 9.5 \sin 225^{\circ} \cdot \cos 135^{\circ}+2 \sin 210^{\circ} \cdot \sin 90^{\circ} $$

Question

Simplify without the use of a calculator: $$ 9.1 \sin 330^{\circ}+\frac{\cos 250^{\circ}}{\sin 160^{\circ}} $$ $$ 9.2 \frac{\sin 120^{\circ} \cdot \cos 135^{\circ} \cdot 	an 240^{\circ}}{\cos 150^{\circ} \cdot 	an 150^{\circ} \cdot \sin 315^{\circ}} $$ $$ 9.3 \frac{1}{\sqrt{3}} \sin 120^{\circ}+\frac{1}{2} 	an 45^{\circ} \cos ^{2} 225^{\circ}-\frac{\sin 55^{\circ}}{\cos 145^{\circ}} $$ $$ 9.4 \frac{\sin ^{2} 300^{\circ}+\sin 240^{\circ} \cos 150^{\circ}}{	an 225^{\circ} \cdot \sin 270^{\circ}} $$ $$ 9.5 \sin 225^{\circ} \cdot \cos 135^{\circ}+2 \sin 210^{\circ} \cdot \sin 90^{\circ} $$

UpStudy AI · Accepted Answer

Calculate the value by following steps:
- step0: Calculate:
  $$\sin\left(225\right)\cos\left(135\right)+2\sin\left(210\right)\sin\left(90\right)$$
- step1: Calculate the trigonometric value:
  $$1.762734$$
Calculate or simplify the expression $$ (\sin(120)*\cos(135)*\tan(240))/(\cos(150)*\tan(150)*\sin(315)) $$.
Calculate the value by following steps:
- step0: Calculate:
  $$\frac{\left(\sin\left(120\right)\cos\left(135\right)\tan\left(240\right)\right)}{\left(\cos\left(150\right)\tan\left(150\right)\sin\left(315\right)\right)}$$
- step1: Remove the parentheses:
  $$\frac{\sin\left(120\right)\cos\left(135\right)\tan\left(240\right)}{\cos\left(150\right)\tan\left(150\right)\sin\left(315\right)}$$
- step2: Transform the expression:
  $$\frac{\frac{\sin\left(120\right)\cos\left(135\right)\sin\left(240\right)}{\cos\left(240\right)}}{\cos\left(150\right)\tan\left(150\right)\sin\left(315\right)}$$
- step3: Transform the expression:
  $$\frac{\frac{\sin\left(120\right)\cos\left(135\right)\sin\left(240\right)}{\cos\left(240\right)}}{\sin\left(315\right)\sin\left(150\right)}$$
- step4: Multiply by the reciprocal:
  $$\frac{\sin\left(120\right)\cos\left(135\right)\sin\left(240\right)}{\cos\left(240\right)}\times \frac{1}{\sin\left(315\right)\sin\left(150\right)}$$
- step5: Multiply the terms:
  $$\frac{\sin\left(120\right)\cos\left(135\right)\sin\left(240\right)}{\cos\left(240\right)\sin\left(315\right)\sin\left(150\right)}$$
- step6: Transform the expression:
  $$\frac{\sin\left(120\right)\cos\left(135\right)\tan\left(240\right)}{\sin\left(315\right)\sin\left(150\right)}$$
- step7: Transform the expression:
  $$\sin\left(120\right)\cos\left(135\right)\tan\left(240\right)\csc\left(315\right)\csc\left(150\right)$$
Calculate or simplify the expression $$ (\sin(300)^2+\sin(240)*\cos(150))/(\tan(225)*\sin(270)) $$.
Calculate the value by following steps:
- step0: Calculate:
  $$\frac{\left(\sin\left(300^{2}\right)+\sin\left(240\right)\cos\left(150\right)\right)}{\left(\tan\left(225\right)\sin\left(270\right)\right)}$$
- step1: Remove the parentheses:
  $$\frac{\sin\left(300^{2}\right)+\sin\left(240\right)\cos\left(150\right)}{\tan\left(225\right)\sin\left(270\right)}$$
- step2: Calculate the trigonometric value:
  $$0.721553$$
Calculate or simplify the expression $$ (1/\sqrt(3))*\sin(120)+(1/2)*\tan(45)*\cos(225)^2-(\sin(55)/\cos(145)) $$.
Calculate the value by following steps:
- step0: Calculate:
  $$\left(\frac{1}{\sqrt{3}}\right)\sin\left(120\right)+\frac{1}{2}\tan\left(45\right)\cos\left(225^{2}\right)-\left(\frac{\sin\left(55\right)}{\cos\left(145\right)}\right)$$
- step1: Remove the parentheses:
  $$\frac{1}{\sqrt{3}}\times \sin\left(120\right)+\frac{1}{2}\tan\left(45\right)\cos\left(225^{2}\right)-\left(\frac{\sin\left(55\right)}{\cos\left(145\right)}\right)$$
- step2: Remove the parentheses:
  $$\frac{1}{\sqrt{3}}\times \sin\left(120\right)+\frac{1}{2}\tan\left(45\right)\cos\left(225^{2}\right)-\frac{\sin\left(55\right)}{\cos\left(145\right)}$$
- step3: Multiply the terms:
  $$\frac{\sqrt{3}\times \sin\left(120\right)}{3}+\frac{1}{2}\tan\left(45\right)\cos\left(225^{2}\right)-\frac{\sin\left(55\right)}{\cos\left(145\right)}$$
- step4: Multiply:
  $$\frac{\sqrt{3}\times \sin\left(120\right)}{3}+\frac{\tan\left(45\right)\cos\left(225^{2}\right)}{2}-\frac{\sin\left(55\right)}{\cos\left(145\right)}$$
- step5: Add the numbers:
  $$\frac{2\sqrt{3}\times \sin\left(120\right)+3\tan\left(45\right)\cos\left(225^{2}\right)}{6}-\frac{\sin\left(55\right)}{\cos\left(145\right)}$$
- step6: Reduce fractions to a common denominator:
  $$\frac{\left(2\sqrt{3}\times \sin\left(120\right)+3\tan\left(45\right)\cos\left(225^{2}\right)\right)\cos\left(145\right)}{6\cos\left(145\right)}-\frac{\sin\left(55\right)\times 6}{\cos\left(145\right)\times 6}$$
- step7: Reorder the terms:
  $$\frac{\left(2\sqrt{3}\times \sin\left(120\right)+3\tan\left(45\right)\cos\left(225^{2}\right)\right)\cos\left(145\right)}{6\cos\left(145\right)}-\frac{\sin\left(55\right)\times 6}{6\cos\left(145\right)}$$
- step8: Transform the expression:
  $$\frac{\left(2\sqrt{3}\times \sin\left(120\right)+3\tan\left(45\right)\cos\left(225^{2}\right)\right)\cos\left(145\right)-\sin\left(55\right)\times 6}{6\cos\left(145\right)}$$
- step9: Apply the distributive property:
  $$\frac{2\sqrt{3}\times \sin\left(120\right)\cos\left(145\right)+3\tan\left(45\right)\cos\left(225^{2}\right)\cos\left(145\right)-\sin\left(55\right)\times 6}{6\cos\left(145\right)}$$
- step10: Reorder the terms:
  $$\frac{2\sqrt{3}\times \sin\left(120\right)\cos\left(145\right)+3\tan\left(45\right)\cos\left(225^{2}\right)\cos\left(145\right)-6\sin\left(55\right)}{6\cos\left(145\right)}$$
- step11: Calculate the trigonometric value:
  $$1.623119$$
Calculate or simplify the expression $$ 9.1*\sin(330)+\cos(250)/\sin(160) $$.
Calculate the value by following steps:
- step0: Calculate:
  $$9.1\sin\left(330\right)+\frac{\cos\left(250\right)}{\sin\left(160\right)}$$
- step1: Convert the expressions:
  $$\frac{91}{10}\sin\left(330\right)+\frac{\cos\left(250\right)}{\sin\left(160\right)}$$
- step2: Rewrite the expression:
  $$\frac{91\sin\left(330\right)}{10}+\frac{\cos\left(250\right)}{\sin\left(160\right)}$$
- step3: Reduce fractions to a common denominator:
  $$\frac{91\sin\left(330\right)\sin\left(160\right)}{10\sin\left(160\right)}+\frac{\cos\left(250\right)\times 10}{\sin\left(160\right)\times 10}$$
- step4: Reorder the terms:
  $$\frac{91\sin\left(330\right)\sin\left(160\right)}{10\sin\left(160\right)}+\frac{\cos\left(250\right)\times 10}{10\sin\left(160\right)}$$
- step5: Transform the expression:
  $$\frac{91\sin\left(330\right)\sin\left(160\right)+\cos\left(250\right)\times 10}{10\sin\left(160\right)}$$
- step6: Reorder the terms:
  $$\frac{91\sin\left(330\right)\sin\left(160\right)+10\cos\left(250\right)}{10\sin\left(160\right)}$$
- step7: Calculate the trigonometric value:
  $$-0.106402$$
Let's simplify each expression step by step:

### 9.1 
Expression: 
$$
9.1 \sin 330^{\circ} + \frac{\cos 250^{\circ}}{\sin 160^{\circ}}
$$

1. **Calculate $$\sin 330^{\circ}$$**:
   $$\sin 330^{\circ} = -\frac{1}{2}$$

2. **Calculate $$\cos 250^{\circ}$$**:
   $$\cos 250^{\circ} = -\cos(70^{\circ}) = -\frac{1}{2}$$

3. **Calculate $$\sin 160^{\circ}$$**:
   $$\sin 160^{\circ} = \sin(20^{\circ})$$

4. **Combine**:
   $$
   9.1 \cdot (-\frac{1}{2}) + \frac{-\frac{1}{2}}{\sin(20^{\circ})} = -4.55 - \frac{1}{2\sin(20^{\circ})}
   $$

Final result:
$$
-0.106402
$$

### 9.2 
Expression: 
$$
\frac{\sin 120^{\circ} \cdot \cos 135^{\circ} \cdot \tan 240^{\circ}}{\cos 150^{\circ} \cdot \tan 150^{\circ} \cdot \sin 315^{\circ}}
$$

1. **Calculate $$\sin 120^{\circ}$$**:
   $$\sin 120^{\circ} = \frac{\sqrt{3}}{2}$$

2. **Calculate $$\cos 135^{\circ}$$**:
   $$\cos 135^{\circ} = -\frac{1}{\sqrt{2}}$$

3. **Calculate $$\tan 240^{\circ}$$**:
   $$\tan 240^{\circ} = \frac{\sin 240^{\circ}}{\cos 240^{\circ}} = \frac{-\frac{\sqrt{3}}{2}}{-\frac{1}{2}} = \sqrt{3}$$

4. **Calculate $$\cos 150^{\circ}$$**:
   $$\cos 150^{\circ} = -\frac{\sqrt{3}}{2}$$

5. **Calculate $$\tan 150^{\circ}$$**:
   $$\tan 150^{\circ} = -\frac{1}{\sqrt{3}}$$

6. **Calculate $$\sin 315^{\circ}$$**:
   $$\sin 315^{\circ} = -\frac{\sqrt{2}}{2}$$

Final result:
$$
\sin(120)\cos(135)\tan(240)\csc(315)\csc(150)
$$

### 9.3 
Expression: 
$$
\frac{1}{\sqrt{3}} \sin 120^{\circ} + \frac{1}{2} \tan 45^{\circ} \cos^{2} 225^{\circ} - \frac{\sin 55^{\circ}}{\cos 145^{\circ}}
$$

1. **Calculate $$\sin 120^{\circ}$$**:
   $$\sin 120^{\circ} = \frac{\sqrt{3}}{2}$$

2. **Calculate $$\tan 45^{\circ}$$**:
   $$\tan 45^{\circ} = 1$$

3. **Calculate $$\cos 225^{\circ}$$**:
   $$\cos 225^{\circ} = -\frac{1}{\sqrt{2}}$$

4. **Calculate $$\cos^{2} 225^{\circ}$$**:
   $$\cos^{2} 225^{\circ} = \frac{1}{2}$$

5. **Calculate $$\sin 55^{\circ}$$** and $$\cos 145^{\circ}$$:
   $$\cos 145^{\circ} = -\sin(35^{\circ})$$

Final result:
$$
1.623119
$$

### 9.4 
Expression: 
$$
\frac{\sin^{2} 300^{\circ} + \sin 240^{\circ} \cos 150^{\circ}}{\tan 225^{\circ} \cdot \sin 270^{\circ}}
$$

1. **Calculate $$\sin 300^{\circ}$$**:
   $$\sin 300^{\circ} = -\frac{\sqrt{3}}{2}$$

2. **Calculate $$\sin^{2} 300^{\circ}$$**:
   $$\sin^{2} 300^{\circ} = \frac{3}{4}$$

3. **Calculate $$\sin 240^{\circ}$$**:
   $$\sin 240^{\circ} = -\frac{\sqrt{3}}{2}$$

4. **Calculate $$\cos 150^{\circ}$$**:
   $$\cos 150^{\circ} = -\frac{\sqrt{3}}{2}$$

5. **Calculate $$\tan 225^{\circ}$$**:
   $$\tan 225^{\circ} = 1$$

6. **Calculate $$\sin 270^{\circ}$$**:
   $$\sin 270^{\circ} = -1$$

Final result:
$$
0.721553
$$

### 9.5 
Expression: 
$$
\sin 225^{\circ} \cdot \cos 135^{\circ} + 2 \sin 210^{\circ} \cdot \sin 90^{\circ}
$$

1. **Calculate $$\sin 225^{\circ}$$**:
   $$\sin 225^{\circ} = -\frac{1}{\sqrt{2}}$$

2. **Calculate $$\cos 135^{\circ}$$**:
   $$\cos 135^{\circ} = -\frac{1}{\sqrt{2}}$$

3. **Calculate $$\sin 210^{\circ}$$**:
   $$\sin 210^{\circ} = -\frac{1}{2}$$

4. **Calculate $$\sin 90^{\circ}$$**:
   $$\sin 90^{\circ} = 1$$

Final result:
$$
1.762734
$$

### Summary of Results:
- **9.1**: $$-0.106402$$
- **9.2**: $$\sin(120)\cos(135)\tan(240)\csc(315)\csc(150)$$
- **9.3**: $$1.623119$$
- **9.4**: $$0.721553$$
- **9.5**: $$1.762734$$
The simplified results are as follows: 1. **9.1**: $$-0.106402$$ 2. **9.2**: $$\sin(120)\cos(135)\tan(240)\csc(315)\csc(150)$$ 3. **9.3**: $$1.623119$$ 4. **9.4**: $$0.721553$$ 5. **9.5**: $$1.762734$$

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