Q#5A
Math019
Ch 4.3-4.5; 13.1-2
#1-11 #12
@4
@6
Name
/50
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = sec(5x)
[#2] y = cos(4x + 5)
[#3] y = cot(7x3)
[#4] y = 3x·LN(5x)
[#5] y = 46x
[#6] y = log 6
[#7] y = 3·csc(4x)
[#8] y = -4·e5x + 3
[#9] y = sin(2x)
[#10] y = 6·(4x2 - 3)20
[#11] y = tan(2·e3x)
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
cot(-210o)
exact answer here
Q#5B
Math019
Ch 4.3-4.5; 13.1-2
#1-11 #12
@4
@6
Name
/50
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = sin(4x)
[#2] y = -3·e4x + 2
[#3] y = log 5
[#4] y = 35x
[#5] y = 5·(3x2 - 5)30
[#6] y = sec(4x)
[#7] y = cot(6x4)
[#8] y = cos(6x + 4)
[#9] y = 5x·LN(2x)
[#10] y = 5·csc(3x)
[#11] y = tan(4·e5x)
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
sec(-240o)
exact answer here
Q#5Extra-1
Math019
Ch 4.3-4.5; 13.1-2
Name
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = cos(6x)
[#2] y = csc(7x - 5)
[#3] y = 4·(6x4 + 5)18
[#4] y = 7·sec(5x)
[#5] y = 5·46x
[#6] y = log 8
[#7] y = cot(7x3)
[#8] y = 3x·LN(5x)
[#9] y = -6·e7x + 9
[#10] y = tan(2·e3x)
[#11] y = ( sin(3x2) )3
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
tan(-120o)
exact answer here
Q#5Extra-2
Math019
Ch 4.3-4.5; 13.1-2
Name
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = cot(6x3)
[#2] y = -5csc(7 - 5x2)
[#3] y = 4·(5x6 + 5)15
[#4] y = 7·cot(3-5x)
[#5] y = -6·35x
[#6] y = 4·log 7
[#7] y = tan(5x4)
[#8] y = 3x2·LN(6x)
[#9] y = -4·e7 -
[#10] y = -5sin(2·e3x)
[#11] y = ( cos(2x3) )4
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
sec(120o)
9x
exact answer here
Q#5A
Math019
Ch 4.3-4.5; 13.1-2
#1-11 #12
@4
@6
Name
/50
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = sec(5x)
[#2] y = cos(4x + 5)
[#3] y = cot(7x3)
[#4] y = 3x·LN(5x)
[#5] y = 46x
[#6] y = log 6
[#7] y = 3·csc(4x)
[#8] y = -4·e5x + 3
[#9] y = sin(2x)
[#10] y = 6·(4x2 - 3)20
[#11] y = tan(2·e3x)
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
cot(-210o)
exact answer here
Q#5B
Math019
Ch 4.3-4.5; 13.1-2
#1-11 #12
@4
@6
Name
/50
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = sin(4x)
[#2] y = -3·e4x + 2
[#3] y = log 5
[#4] y = 35x
[#5] y = 5·(3x2 - 5)30
[#6] y = sec(4x)
[#7] y = cot(6x4)
[#8] y = cos(6x + 4)
[#9] y = 5x·LN(2x)
[#10] y = 5·csc(3x)
[#11] y = tan(4·e5x)
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
sec(-240o)
exact answer here
Q#5Extra-1
Math019
Ch 4.3-4.5; 13.1-2
Name
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = cos(6x)
[#2] y = csc(7x - 5)
[#3] y = 4·(6x4 + 5)18
[#4] y = 7·sec(5x)
[#5] y = 5·46x
[#6] y = log 8
[#7] y = cot(7x3)
[#8] y = 3x·LN(5x)
[#9] y = -6·e7x + 9
[#10] y = tan(2·e3x)
[#11] y = ( sin(3x2) )3
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
tan(-120o)
exact answer here
Q#5Extra-2
Math019
Ch 4.3-4.5; 13.1-2
Name
date
Show all necessary work in a neat and orderly manner.
[#1-#11]
Find the derivative of each function. Do use the chain rule, the product rule, and the quotient rule as
necessary. No need to simplify your answers.
[#1] y = cot(6x3)
[#2] y = -5csc(7 - 5x2)
[#3] y = 4·(5x6 + 5)15
[#4] y = 7·cot(3-5x)
[#5] y = -6·35x
[#6] y = 4·log 7
[#7] y = tan(5x4)
[#8] y = 3x2·LN(6x)
[#9] y = -4·e7 -
[#10] y = -5sin(2·e3x)
[#11] y = ( cos(2x3) )4
Picture here.
[#12] Draw a diagram of a triangle
in standard position to determine the
EXACT value of this expression.
sec(120o)
9x
exact answer here