Question

In: Advanced Math

a) ? 2 − ? = 49 b) ? 2 + ? − ? 2 =...

a) ? 2 − ? = 49 b) ? 2 + ? − ? 2 = 49 c) ? 2 + ? 2 − ? 2 = 49 d) ? 2 − ? 2 − ? 2 = 49 e) ? 2 + 2? 2 + ? 2 = 49 f) ? 2 + ? 2 − ? = 49 7. Which of the given equations represent a cylinder surface? What kind of cylinder is it, and what axis is it parallel to? 8. What are the traces of the graph of equation (d) in the planes ? = 6, ? = 7 and ? = 8? (Give equations in ? and ?, and name the 2D shapes.) What kind of 3D surface is the graph of equation (d)

Solutions

Expert Solution

The answer is in the pic. If any doubt still remained, let me know in the comment section.
If this solution helped, please don't forget to upvote us to encourage us. We need your support. Thanks ☺☺☺ :)

Colby Messinger answered 2 years ago
Next > < Previous

Related Solutions

PPS S/O A B A B 1 $48 $40 50 100 2 52 49 50 100...
PPS S/O A B A B 1 $48 $40 50 100 2 52 49 50 100 3 39 24 50 200 4 58 27 50 200 5 66 25 50 200 *Stock B has a two-for-one stock split in year 3. Calculate the price-weighted index and the value-weighted index. Calculate the percentage change from year 2 to year 3 for both indexes. PPS=Price per share. S/O= Shares outstanding
Let ?(?)= (sqrt ?) The local linearization of ? at 49 is ? (subscript) 49(?) =...
Let ?(?)= (sqrt ?) The local linearization of ? at 49 is ? (subscript) 49(?) = ? (subscript)0 +?(?−49) is __________ where ?= __________ and ? (subscript) 0= _____________ Using this, we find our approximation (sqrt 49.3) = ___________
2. There is a monopolistic incumbent in a market. Its cost function is C(q) =49 +...
2. There is a monopolistic incumbent in a market. Its cost function is C(q) =49 + 2q, and the market demand function is D(P) = 100 − P. There is a potential entrant who has the same cost function as the incumbent. Assume the Bain-Sylos postulate. Let the I incumbent firm’s output be denoted by q . a. Derive the residual demand function for the potential entrant. I b. Given that the incumbent firm is currently producing q , if...
# R Hypothesis Tests install.packages("dplyr") tScore_before <- c(40, 62, 74, 22, 64, 65, 49, 49, 49)...
# R Hypothesis Tests install.packages("dplyr") tScore_before <- c(40, 62, 74, 22, 64, 65, 49, 49, 49) tScore_after <- c(68, 61, 64, 76, 90, 75, 66, 60, 63) # Create a data frame my_data <- data.frame(                 group = rep(c("Score Before", "Score After"), each = 9),                 scores = c(tScore_before, tScore_after)                 ) # Print all data print(my_data) #Compute summary statistics by groups library(dplyr) group_by(my_data, group) %>% summarise(     count = n(),     mean = mean(scores, na.rm = TRUE),     sd...
Consider the following sample data: 30 32 22 49 28 32 a. Calculate the range. b....
Consider the following sample data: 30 32 22 49 28 32 a. Calculate the range. b. Calculate MAD. (Round your intermediate calculations to at least 4 decimal places and final answer to 2 decimal places.) c. Calculate the sample variance. (Round your intermediate calculations to at least 4 decimal places and final answer to 2 decimal places.) d. Calculate the sample standard deviation. (Round your intermediate calculations to at least 4 decimal places and final answer to 2 decimal places.)
Prove that if A and B are 2x2 matrices, then (A + B)^(2) = A^(2) +...
Prove that if A and B are 2x2 matrices, then (A + B)^(2) = A^(2) + AB + BA + B^(2). Hint: Write out 2x2 matrices for A and B using variable entries in each location and perform the operations on either side of the equation to determine whether the two sides are equivalent.
Let Z[ √ 2] = {a + b √ 2 | a, b ∈ Z}. (a)...
Let Z[ √ 2] = {a + b √ 2 | a, b ∈ Z}. (a) Prove that Z[ √ 2] is a subring of R. (b) Find a unit in Z[ √ 2] that is different than 1 or −1.
Find the mass M of the solid in the shape of the region 4<=x^2+y^2+z^2<=49, sqrt[3(x^2+y^2)] <=...
Find the mass M of the solid in the shape of the region 4<=x^2+y^2+z^2<=49, sqrt[3(x^2+y^2)] <= z if the density at (x,y,z) is sqrt(x^2+y^2+z^2).
Find the area of the surface obtained by rotating the circle x^2+y^2=49 about the line y=7....
Find the area of the surface obtained by rotating the circle x^2+y^2=49 about the line y=7. (Keep two decimal places)
a+b+c=(abc)^(1/2) show that (a(b+c))^(1/2)+(b(c+a))^(1/2)+(c(a+b))^(1/2)>36
a+b+c=(abc)^(1/2) show that (a(b+c))^(1/2)+(b(c+a))^(1/2)+(c(a+b))^(1/2)>36
ADVERTISEMENT
Subjects
ADVERTISEMENT
Latest Questions
ADVERTISEMENT