Numerade

Questions asked

BEST MATCH

AGLC requires licensees to use the following standard servings of liquor when pricing and serving liquor at last call: Spirits and liqueurs: 1 oz. (28.5 mL) Wine: 5 oz. (142 mL) Bottled/canned beer, cider and coolers: 341 mL/bottle or 355 mL/can Draught beer: 12 oz. (341 mL)

View Answer

BEST MATCH

find the general solution of the differential equation Y'-e^(8x+y)=0 using separation of variables

View Answer

BEST MATCH

Choose five other iterated integrals that are equal to the given iterated integral. $\int_0^2 \int_y^2 \int_0^y f(x, y, z) dz dx dy$ $\int_0^2 \int_0^x \int_0^y f(x, y, z) dz dy dx$ $\int_0^2 \int_0^y \int_y^2 f(x, y, z) dx dz dy$ $\int_0^2 \int_z^2 \int_z^x f(x, y, z) dx dy dz$ $\int_0^2 \int_0^z \int_z^x f(x, y, z) dy dz dx$ $\int_0^2 \int_x^2 \int_x^z f(x, y, z) dy dx dz$

View Answer

BEST MATCH

Part A A cube has sides of length L = 0.400 m. It is placed with one corner at the origin as shown in the figure (Figure 1). The electric field is not uniform but is given by $\vec{E} = (-4.11 \text{ N/(C\cdot m)})\hat{z}i + (3.30 \text{ N/(C\cdot m)})\hat{z}k$. Find the electric flux through each of the six cube faces S1, S2, S3, S4, S5, and S6. Enter your answers numerically separated by commas. Figure S1 (left side) L S5 (front) S2 (top) S6 (back) $\Phi_1, \Phi_2, \Phi_3, \Phi_4, \Phi_5, \Phi_6 = $ (N/C)\cdot m^2 Submit Previous Answers Request Answer Incorrect; Try Again; 8 attempts remaining Part B Find the total electric charge inside the cube. 1 of 1 q= C Submit Previous Answers Request Answer Incorrect; Try Again; 2 attempts remaining S3 (right side) < Return to Assignment Provide Feedback S4 (bottom)

View Answer

BEST MATCH

One of the main differences between Platyrrhines and catarrhines is: The shape of their nose The size of their brains The presence/absence of tail The presence/absence of a tooth comb

View Answer

BEST MATCH

1 Point Question 14 Divide and/or multiply as indicated. Simplify and leave the numerator and denominator in your answer in factored form. \frac{1}{x+2} \div \frac{5}{x^2-4}

View Answer

BEST MATCH

For the circuit shown in the figure below, use Kirchhoff's rules to obtain equations for the upper loop, the lower loop, and the node on the left side. In each case suppress units for clarity and simplify, combining like terms. (Use the following as necessary: $I_{18}$, $I_{12}$, and $I_{36}$.) 18.0 V + $I_{18}$ 5.00 ? W 8.00 ? 11.0 ? 12.0 V + 7.00 ? W $I_{12}$ 5.00 ? $I_{36}$ 36.0 V ? (a) the upper loop = 30 (b) the lower loop = 24 (c) the node on the left side = $I_{18}$ (d) Solve the node equation for $I_{36}$ = $I_{36}$ (e) Using the equation found in (d), eliminate $I_{36}$ from the equation found in part (b). = 24

View Answer

BEST MATCH

Write the equation in its equivalent logarithmic form. $6^2 = x$

View Answer

BEST MATCH

Use the General Demand and Supply functions provided below to answer the following 10 questions: Q_D = 110 - 4P_x + 10P_y Q_S = -8 + 2P_x - 4P_R where P_x is the price of x; P_y is the price of good Y and P_R is the price of a resource R. Suppose the present price of good x is P_x = $45, P_y = $9 and P_R = $8. 1 - Based on the demand equation x and Y are 2 - The simplified demand function is: Q_D = 3 - The simplified supply function is: Q_S = and the Quantity 4 - When the price of good x is $45 the Quantity Demanded is Supplied is 5 - When the price of good x is $45 the there is a 6 - The equilibrium price and quantity are: P* = and Q* = 7 - When price of Y increases from $9 to P_y = $17 the NEW simplified demand function is: Q_D = ,- P_x 8 - When price of R decreases from $8 to P_A = $3 the NEW simplified supply function is: Q_S = P_x 9 - When price of Y increases to P_y = $17 and the price of R decreases to P_R = $3 the NEW equilibrium price and quantity are: P* = and Q* = If the NEW equilibrium price P_x of good x changes to $30 there will be a of units.

View Answer

BEST MATCH

Consider a case where total body water (TBW) volume is 45 L and ICF volume is 15L with an equilibrium concentration of 300 mOsM (mOsmols/L). 1. What is an osmole? How many osmoles are found in 10g of MgCl2? 2. Draw a Darrow-Yonnet diagram that shows the initial equilibrium water distribution between body compartments and then shows the adjusted equilibrium osmolarity and water distribution upon ingestion of 15 g of NaCl? Be sure to include the actual quantitative values for final osmolarity and water volumes. 3. How much salt must be ingested to increase the ECF by 0.5L?

View Answer

luis w.