SATA I (revision 1.x) interface, formally known as SATA 1.5Gb/s, is the first generation SATA interface running at 1.5 Gb/s. The bandwidth throughput, which is supported by the interface, is up to 150MB/s. SATA II (revision 2.x) interface, formally known as SATA 3Gb/s, is a second generation SATA interface running at 3.0 Gb/s.
3-600: FIRE PROTECTION
This UFC must be used as the minimum standard for the planning and development of projects and, design, construction and commissioning documentation used for the procurement of Facilities. Examples include, but are not limited to the development of scopes of work, DD1391 documentation, drawings, specification and request for proposals. It is the primary fire protection criteria reference document for services provided by architectural and engineering (A&E) firms and consultants in the development of both design–bid–build and design–build contracts. It is not intended to be used in lieu of detailed design documents in the procurement of Facility construction.
Vellum 2 0 3. Click on the images to open a new tab and see them in full resolution.
1.1 Version 2 Answers
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1. No
2. A. 3 B. -0.2 C. 0,3 D. -0.8 E. domain [-2,4] range: [-1,3] f. [-2,1]
3. A. f(-4)=-2 g(3)=4 f(-3) = -1 g(2) = 2 B. -2,2 C. -3,4 D. [0,4] E. domain [-4,4] range [-2,3] F. domain [-4,3] range [5,4]
4. Yes, domain [-2,2] range [-1,2]
5. Yes, domain [-3,2] range [-3,-2)U[-1,3]
6. A spherical balloon with radius r inches has a volume V(r) = 4/3 pi r^3. Find an expression that represents the amount of air required to inflate the balloon from a radius of r inches to a radius of r + 5 inches. (Express your answer in terms of pi and r.)
Answer: 4pi/3(15r^2+75r+125)
A spherical balloon with radius r inches has a volume V(r) = 4/3 pi r^3. Find an expression that represents the amount of air required to inflate the balloon from a radius of r inches to a radius of r + 2 inches. (Express your answer in terms of pi and r.)
Answer: 4pi/3(6r^2+12r+8)
7. Evaluate the difference quotient for the given function. Ina 103 a 1. Simplify your answer.
f(x) = 4 + 4x –x^2, (f(5+h)-f(5))/h Answer: -h-6
Evaluate the difference quotient for the given function. Simplify your answer.
f(x) = 5 + 3x –x^2, (f(3+h)-f(3))/h Answer: -h-3
Evaluate the difference quotient for the given function. Simplify your answer.
f(x) = 5 + 4x –x^2, (f(3+h)-f(3))/h Answer: -h-2
8. –h^2-3ah-3a^2
9. -1/ax
10. f(x) = (x+4)/(x^2 – 9) Answer: (-infinity,-3)U(-3,3)U(3,infinity)
f(x) = (x+4)/(x^2 – 25) Answer: (-infinity,-5)U(-5,5)U(5,infinity)
11. Find the domain of the function. (Enter your answer using interval notation.)
f(x) = (5x^3-1)/(x^2+2x-3) Answer: (-infinity,-3)U(-3,1)U(1,infinity)
f(x) = (3x^3-4)/(x^2+4x-12) Answer: (-infinity,-6)U(-6,2)U(2,infinity)
f(x) = (4x^3-1)/(x^2+2x-8) Answer: (-infinity,-4)U(-4,2)U(2,infinity)
12. Find the domain of the function. (Enter your answer in interval notation.)
h(x) = 1/(sqrt(x^2-4x)^1/4) Answer: (-infinity,0)U(4,infinity)
h(x) = 1/(sqrt(x^2-6x)^1/4) Answer: (-infinity,0)U(6,infinity)
13. Find the domain of the function. (Enter your answer using interval notation.)
f(x) = {x+6 if x <0
{3 –x if x>= 0
Answer: (-infinity, infinity) *This answer applies to all of the different red numbers too.
14. Find an expression for the function whose graph is the given curve. (Assume that the points are in the form(x, f(x)).)
The line segments joining the points (3, -5) and (7, 9)
Answer: 7x/2 – 31/2
Domain: [3,7]
The line segments joining the points (3, -3) and (7, 11)
Answer: 7x/2 – 27/2
Domain: [3,7]
The line segments joining the points (1, -4) and (5, -2)
Answer: 1x/2 – 9/2
Domain: [1,5]
15. Find a formula for the described function. A rectangle has perimeter of 16 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 8L-L^2
Domain: (4,8)
Find a formula for the described function. A rectangle has perimeter of 20 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 10L – L^2
Domain: (5,10)
Find a formula for the described function. A rectangle has perimeter of 24 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 12L – L^2
Domain: (6,12)
2. A. 3 B. -0.2 C. 0,3 D. -0.8 E. domain [-2,4] range: [-1,3] f. [-2,1]
3. A. f(-4)=-2 g(3)=4 f(-3) = -1 g(2) = 2 B. -2,2 C. -3,4 D. [0,4] E. domain [-4,4] range [-2,3] F. domain [-4,3] range [5,4]
4. Yes, domain [-2,2] range [-1,2]
5. Yes, domain [-3,2] range [-3,-2)U[-1,3]
6. A spherical balloon with radius r inches has a volume V(r) = 4/3 pi r^3. Find an expression that represents the amount of air required to inflate the balloon from a radius of r inches to a radius of r + 5 inches. (Express your answer in terms of pi and r.)
Answer: 4pi/3(15r^2+75r+125)
A spherical balloon with radius r inches has a volume V(r) = 4/3 pi r^3. Find an expression that represents the amount of air required to inflate the balloon from a radius of r inches to a radius of r + 2 inches. (Express your answer in terms of pi and r.)
Answer: 4pi/3(6r^2+12r+8)
7. Evaluate the difference quotient for the given function. Ina 103 a 1. Simplify your answer.
f(x) = 4 + 4x –x^2, (f(5+h)-f(5))/h Answer: -h-6
Evaluate the difference quotient for the given function. Simplify your answer.
f(x) = 5 + 3x –x^2, (f(3+h)-f(3))/h Answer: -h-3
Evaluate the difference quotient for the given function. Simplify your answer.
f(x) = 5 + 4x –x^2, (f(3+h)-f(3))/h Answer: -h-2
8. –h^2-3ah-3a^2
9. -1/ax
10. f(x) = (x+4)/(x^2 – 9) Answer: (-infinity,-3)U(-3,3)U(3,infinity)
f(x) = (x+4)/(x^2 – 25) Answer: (-infinity,-5)U(-5,5)U(5,infinity)
11. Find the domain of the function. (Enter your answer using interval notation.)
f(x) = (5x^3-1)/(x^2+2x-3) Answer: (-infinity,-3)U(-3,1)U(1,infinity)
f(x) = (3x^3-4)/(x^2+4x-12) Answer: (-infinity,-6)U(-6,2)U(2,infinity)
f(x) = (4x^3-1)/(x^2+2x-8) Answer: (-infinity,-4)U(-4,2)U(2,infinity)
12. Find the domain of the function. (Enter your answer in interval notation.)
h(x) = 1/(sqrt(x^2-4x)^1/4) Answer: (-infinity,0)U(4,infinity)
h(x) = 1/(sqrt(x^2-6x)^1/4) Answer: (-infinity,0)U(6,infinity)
13. Find the domain of the function. (Enter your answer using interval notation.)
f(x) = {x+6 if x <0
{3 –x if x>= 0
Answer: (-infinity, infinity) *This answer applies to all of the different red numbers too.
14. Find an expression for the function whose graph is the given curve. (Assume that the points are in the form(x, f(x)).)
The line segments joining the points (3, -5) and (7, 9)
Answer: 7x/2 – 31/2
Domain: [3,7]
The line segments joining the points (3, -3) and (7, 11)
Answer: 7x/2 – 27/2
Domain: [3,7]
The line segments joining the points (1, -4) and (5, -2)
Answer: 1x/2 – 9/2
Domain: [1,5]
15. Find a formula for the described function. A rectangle has perimeter of 16 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 8L-L^2
Domain: (4,8)
Find a formula for the described function. A rectangle has perimeter of 20 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 10L – L^2
Domain: (5,10)
Find a formula for the described function. A rectangle has perimeter of 24 m. Express the area A of the rectangle as a function of length, L, of one of its sides.
Answer: A = 12L – L^2
Domain: (6,12)
Xversion 1 3 600 Mg
Photoscape x photo editor 2 9. 16. A cell phone plan has a basic charge of $40 a month. The plan includes a 600 free minutes and charges 10 cents for each additional minute of usage. Write the monthly cost C (in dollars) as a function of the number x of minutes used.
C(x) = { 40 if 0 <= x <= 600
{40 + 0.10(x-600) if x>600
C(x) = { 40 if 0 <= x <= 600
{40 + 0.10(x-600) if x>600
Xversion 1 3 600
A cell phone plan has a basic charge of $45 a month. The plan includes a 600 free minutes and charges 10 cents for each additional minute of usage. Write the monthly cost C (in dollars) as a function of the number x of minutes used.
C(x) = { 45 if 0 <= x <= 600
{45 + 0.10(x-600) if x>600
C(x) = { 45 if 0 <= x <= 600
{45 + 0.10(x-600) if x>600