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Title: Mathematics Exam + Solutions
Description: With this file, you can exercise and prepare for your 1st year in uni math exam πͺπ». I wrote the exam duration so you can know whether you finish in timeβ³! Also, I put in the solutions to the exercises, so you can check your answers :)
Description: With this file, you can exercise and prepare for your 1st year in uni math exam πͺπ». I wrote the exam duration so you can know whether you finish in timeβ³! Also, I put in the solutions to the exercises, so you can check your answers :)
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Mathematics Exam 11/13/2024
β± 60β
1) LIMITS Calculate the following limit
lim log $ βπ₯
!β#
%
o 0
o ββ
o
!
"
o +β
2) VECTORS Determine the polar coordinates (π, πΌ) of π’
(β with A (0, β4)
#
o π = 4 ; πΌ = $
%
o π = β4 ; πΌ = β $ π
o they are not deο¬ned
%
o π = 4 ; πΌ = $ π
3) VECTORS a- Determine π so that π’ (2, 2π) and π£ 4β3, 18 are orthogonal
b- Determine the angle πΌ between π’ and the versor βπ₯
(β(0, β 1)
o π’ = 4β3, 18 ; πΌ =
#
%
o π’ = 41, ββ38 ; πΌ =
#
&
o π’ = 42, β2β38 ; πΌ =
#
&
#
o π’ = 42, 2β38 ; πΌ = β &
4) DERIVATIVE Given the function π (π₯ ) = β10(π₯ $ β 2), determine if there
is a maximum or a minimum in π₯ = 0
o the function has a minimum in π₯ = 0
o the function has a maximum in π₯ = 0
o the function neither has a maximum nor a minimum in π₯ = 0
o the function is increasing in π₯ = 0
2 3
5) ALGEBRA Determine the inverse matrix π΄'! of A ?
@
β1 1
1
?
( 1
5
o ?
5
! 5
o (?
0
1
o ?
1
o
!
β3
@
2
β15
@
10
0
@
5
β3
@
2
6) ALGEBRA Determine the real eigenvalues and eventual orthogonal
β3 0
eigenvectors of A ?
@
0 3
o no, there are no real eigenvalues
o yes, there are two real eigenvalues, but no eigenvectors
o yes, there are two real eigenvalues with their respective eigenvectors,
but they are not necessarily orthogonal
o yes, there are two eigenvalues with their respective orthogonal
eigenvectors
7) ALGEBRA Given the following equations, determine πβ₯ and π* so that
the lines can be respectively parallel and orthogonal
2π₯ + π¦ = 7
C
ππ₯ β π¦ = β1
!
o πβ₯ = 2 ; π* = $
o πβ₯ = 2 ; π* = 1
o πβ₯ = β1 ; π* = 2
!
o πβ₯ = β2 ; π* = $
8) DERIVATIVE Calculate the ο¬rst derivative of π(π₯) = β2π₯ + 1
o π +(-) =
o π
+(-)
!
β$-0!
= 2π₯ + 3
"
o π
!
+(-)1$($-0!) #
o π +(-) =
$
β$-0!
1
9) ALGEBRA Given π£β (0, β2, 0) and π΄ F2H, calculate π£β β π΄
6
o
o
o
o
β12
β4
0
itβs not deο¬ned
10) PARTIALD Given the function π(π₯, π¦) = 5π₯ + cos π¦, determine the
second derivative π-2 (0, 0)
o
o
o
o
1
5
0
ββ
11) FUNCTIONS Determine the centre C and the radius R of the following
function
π₯ $ + π¦ $ = 6y
o
o
o
o
πΆ (0, 0) ; π = P6π¦
πΆ (0, 6) ; π = 9
πΆ (0, 3) ; π = 3
πΆ = 0 ; π = 3
12) PARTIALD Given the function π(π₯, π¦) = 5π₯ + ln π¦, determine the second
derivative π-2 (0, 0)
o 5
o ββ
o
!
(
o 0
13) LIMITS Calculate the following limit
lim log$' π !
!β&#
o
o
o
o
ββ
+β
itβs not deο¬ned
0
14) SERIES To which function the following series corresponds
6
π(π₯) = T
($3)#$
417 ($4)!
o
o
o
o
π(π₯) = cos π₯
π(π₯) = sin π₯
π(π₯) = cos 2π₯
π(π₯) = e$3
(((β (β1, 1) of π(π₯, π¦) = π₯ $ π¦
15) PARTIALD Determine βf
o
o
o
o
(β2, 1)
(2, 1)
β2
1
16) SERIES To which function the following series corresponds
6
π (π₯ ) = T
417
(%3)$
4!
o π(π₯) = cos 3π₯
!
o π(π₯) = (!'-)"
o π(π₯) = e%3
!
o π(π₯) = !0-"
17) DERIVATIVE Determine the tangent line to π(π₯) = 3π₯ $ in the point π₯7 =
1
o
o
o
o
π¦ = 3(2π₯ β 1)
π¦=0
π¦=6
π¦ = 6π₯
18) INTEGRALS Determine if the following integral is proper, improper,
eventually calculable
!
Y
7
o
o
o
o
itβs improper but calculable
itβs improper and not calculable
itβs proper and calculable
itβs not calculable
1
βπ₯
ππ₯
2 3
β2 β5
19) ALGEBRA Given the following matrices A ?
@ and B ?
@,
β1 1
1
2
calculate C = AB
β4 β1
o C?
@
7
3
0 β2
o C?
@
0 3
β1 β4
o C?
@
3
7
β4 β15
o C?
@
β1
2
20) FUNCTIONS Determine if [
o
o
o
o
0 π π π₯ β€ 0
is continuous in π₯ = 0
0,1 π π π₯ > 0
π(π₯) is deο¬ned and continuous in π₯ = 0
π(π₯) is discontinuous in π₯ = 0
π(π₯) is not deο¬ned in π₯ = 0
π(π₯) is continuous but singular in π₯ = 0
21) FUNCTIONS Determine the inverse function of π¦ = sin π₯ on the entire
real line
o
o
o
o
arcsin π₯
the function does not have the inverse on the entire real line
cos π₯
sin'! π¦
22) DIFFEQ Determine the functional development in π¦(π‘) of
o
o
o
o
quadratic in t
constant in t
exponential in t
linear in t
82
89
= π¦π‘
23) FUNCTIONS Determine the inverse function of 10o
o
o
o
#
(π₯ $ )!7
log $ 10an inverse function does not exist
2 log!7 π₯
24) FUNCTIONS Given the following functions
#
π! (π₯) = π '- π$ (π₯) = π '!7- π% (π₯) = π '- π" (π₯) = π 'β- ,
determine the higher-order inο¬nitesimal π₯ β +β
o
o
o
o
π"
π!
π%
π$
25) LIMITS Calculate the following limit
sin 2π₯
!β' 2π₯
lim
o
o
o
o
1
itβs not deο¬ned
0
2π
Solutions
1) ββ
%
2) π = 4 ; πΌ = $ π
3) π’ = 42, β2β38 ; πΌ =
#
&
4) the function has a maximum in π₯ = 0
! 1 β3
5) ( ?
@
1 2
6) yes, there are two eigenvalues with their respective orthogonal
eigenvectors
!
7) πβ₯ = β2 ; π* = $
8) π +(-) =
!
β$-0!
9) β4
10) 0
11) πΆ (0, 3) ; π = 3
12) 0
13) ββ
14) π(π₯) = cos 2π₯
15) (β2, 1)
16) π(π₯) = e%3
17) π¦ = 3(2π₯ β 1)
18) itβs improper but calculable
β1 β4
19) C?
@
3
7
20) π(π₯) is discontinuous in π₯ = 0
21) the function does not have the inverse on the entire real line
22) constant in t
23) 2 log!7 π₯
24) π$ (π₯) = π '!725) 1
Title: Mathematics Exam + Solutions
Description: With this file, you can exercise and prepare for your 1st year in uni math exam πͺπ». I wrote the exam duration so you can know whether you finish in timeβ³! Also, I put in the solutions to the exercises, so you can check your answers :)
Description: With this file, you can exercise and prepare for your 1st year in uni math exam πͺπ». I wrote the exam duration so you can know whether you finish in timeβ³! Also, I put in the solutions to the exercises, so you can check your answers :)