Q: How many tablespoons are equivalent to 3 ounces?

The correct answer is:6 tablespoons Explanation A US fluid ounce is a measure of volume: $1\ \text{fl oz} = 2\ \text{tbsp}$. So multiply that conversion by 3. Steps: Use the conversion: $$1\ \text{fl oz} = 2\ \text{tbsp}$$ Multiply by 3: $$3\ \text{fl oz} = 3 \times 2\ \text{tbsp} = 6\ \text{tbsp}$$ Therefore, 3 ounces equals 6 tablespoons.

Q: How many pounds is 62 kg?

The correct answer is: $136.6866025546241\text{ lb}$ Explanation We use the conversion factor $1\text{ kg} = 2.2046226218487757\text{ lb}$. Steps: Multiply the mass by the conversion factor: $$62\text{ kg}\times 2.2046226218487757\frac{\text{lb}}{\text{kg}} = 136.6866025546241\text{ lb}$$ Round as desired: to two decimal places $$\approx 136.69\text{ lb}$$ (to one decimal place $$\approx 136.7\text{ lb}$$). Therefore, 62 kg ≈ 136.69 lb (exactly about 136.6866 lb).

Q: Convert 165 pounds into kilograms.

The correct answer is: $74.84274105\text{ kg}$ Explanation We convert pounds to kilograms using the exact conversion factor $1\text{ lb} = 0.45359237\text{ kg}$. Multiplying 165 pounds by that factor gives the mass in kilograms. Steps: Use the conversion factor: $1\text{ lb} = 0.45359237\text{ kg}$. Multiply: $$165\times 0.45359237 = 74.84274105$$ Attach the unit: $74.84274105\text{ kg}$. Therefore, 165 pounds equals $74.84274105\text{ kg}$ (commonly rounded to $74.84\text{ kg}$).

Q: What is 300 milliliters in fluid ounces?

The correct answer is: $10.14\text{ US fl oz (approx.)}$ Explanation We convert using the US fluid ounce definition: $1\text{ US fl oz} = 29.5735295625\text{ mL}$, so multiply mL by the factor $1/29.5735295625 \approx 0.0338140226$. Steps: Multiply: $$300\text{ mL}\times 0.0338140226\frac{\text{US fl oz}}{\text{mL}}=10.14420678\text{ US fl oz}$$ Round to a sensible precision: $$\approx10.14\text{ US fl oz}$$ If you meant imperial (UK) fluid ounces instead: $$300\text{ mL}\div28.4130625\frac{\text{mL}}{\text{imp fl oz}}\approx10.56\text{ imp fl oz}$$

Q: What is 103 kg in lbs?

The correct answer is: $227.08\text{ lb}$ Explanation To convert kilograms to pounds multiply by the conversion factor $2.2046226218\text{ lb/kg}$. For 103 kg, multiply 103 by that factor and round to a convenient number of decimal places. Steps: Conversion factor: $1\text{ kg} = 2.2046226218\text{ lb}$ Multiply: $103\text{ kg}\times 2.2046226218\text{ lb/kg} = 227.0761300454\text{ lb}$ Round: $227.0761300454\text{ lb}\approx 227.08\text{ lb}$ Therefore, $103\text{ kg}\approx 227.08\text{ lb}$.

Question

Freezing Point of Water | Temperature, Equation & Examples

Accepted Answer

The freezing point of pure water at standard pressure (1 atm) is 0°C (32°F or 273.15 K).

Explanation
Water freezes at 0°C under 1 atmosphere of pressure. That temperature can change if pressure or dissolved solutes change — common effects are freezing-point depression by solutes and slight melting-point change with pressure. The triple point of water (where solid, liquid, and vapor coexist) is at $0.01^\circ	ext{C}$ and $611.657	ext{ Pa}$.

Key equations

Celsius ↔ Fahrenheit:

$T(^{\circ}	ext{F})=\dfrac{9}{5}T(^{\circ}	ext{C})+32$

Celsius ↔ Kelvin:

$T(	ext{K})=T(^{\circ}	ext{C})+273.15$

Freezing-point depression (colligative property) for a dilute solution:

$$\Delta T_f = i\,K_f\,m$$
where $i$ is the van ‘t Hoff factor (number of particles per formula unit), $K_f$ is the cryoscopic constant ($1.86^\circ\text{C}\cdot\text{kg}\cdot\text{mol}^{-1}$ for water), and $m$ is the molality (mol solute per kg solvent).

Pressure dependence of melting/freezing (Clausius–Clapeyron form):

$$\frac{dP}{dT}=\frac{\Delta H_{	ext{fus}}}{T\,\Delta V}$$  For ice/water this gives an approximate slope of about $-0.0074^\circ	ext{C}$ per atm (melting point falls slightly with increasing pressure).

Examples (step-by-step)

1) Convert the freezing point to Fahrenheit and Kelvin.

Celsius value: $0^\circ	ext{C}$.
Fahrenheit:

$$T(^{\circ}	ext{F})=\frac{9}{5}\cdot 0 + 32 = 32^\circ	ext{F}$$

Kelvin:

$$T(	ext{K})=0 + 273.15 = 273.15	ext{ K}$$

2) Freezing-point depression for 1.00 molal NaCl (approximate; NaCl $	o$ Na$^+$ + Cl$^-$ so $i\approx 2$).

Use $\Delta T_f = i K_f m$:

$$\Delta T_f = 2 	imes 1.86^\circ	ext{C}\cdot	ext{kg}\cdot	ext{mol}^{-1} 	imes 1.00	ext{ m} = 3.72^\circ	ext{C}$$

New freezing point:

$$0^\circ	ext{C} - 3.72^\circ	ext{C} = -3.72^\circ	ext{C}$$(Real solutions deviate from ideality; $i$ and activity effects adjust the result.)

3) Pressure effect (qualitative):

Increasing pressure by 100 atm would lower freezing point by roughly $100 	imes 0.0074^\circ	ext{C} \approx 0.74^\circ	ext{C}$ (approximate).

Important notes

Pure water can supercool below $0^\circ	ext{C}$ and remain liquid if undisturbed or free of nucleation sites.
Impurities (salts, alcohols, sugars) lower the freezing point; this is why salt melts ice on roads.
The triple point at $0.01^\circ	ext{C}$ is used to define the Kelvin temperature scale precisely.

If you want, I can: (a) compute freezing-point depression for a specific solution (type and concentration), (b) show a derivation of the Clausius–Clapeyron relation for solid–liquid equilibrium, or (c) give experimental examples of supercooling. Which would you like?