Math

Problem 38901

Find the domain and range of the relation \{(-6,6),(-5,3),(-4,0),(-3,3)\}. Is it a function? A, B, or C?

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Problem 38902

Santiago bakes 12 dozen cookies needing 34\frac{3}{4} tsp per dozen. How many total tsp of baking soda is required?

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Problem 38903

Find (gh)(1)(g \cdot h)(1) for g(n)=n2+4+2ng(n)=n^{2}+4+2n and h(n)=3n+2h(n)=-3n+2.

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Problem 38904

Find (gh)(4)(g \cdot h)(-4) where g(a)=2a1g(a)=2a-1 and h(a)=3a3h(a)=3a-3.

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Problem 38905

Given the piecewise function f(x)={3+xif x<0x2if x>0f(x) = \begin{cases} 3+x & \text{if } x< 0 \\ x^2 & \text{if } x> 0 \end{cases}, find its domain, intercepts, graph, and range.

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Problem 38906

Calculate the sum: 78+49=\frac{7}{8}+\frac{4}{9}=

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Problem 38907

Find (fg)(4)(f-g)(4) where f(x)=4x3f(x)=4x-3 and g(x)=x3+2xg(x)=x^3+2x.

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Problem 38908

Calculate 78+49\frac{7}{8}+\frac{4}{9}.

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Problem 38909

Determine if the function f(x)=x57xf(x)=x^{5}-7 x is even, odd, or neither.

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Problem 38910

Find (h+g)(10)(h+g)(10) where h(x)=3x+3h(x)=3x+3 and g(x)=4x+1g(x)=-4x+1.

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Problem 38911

Calculate the annual growth rate of consumer credit (about \$85.27B) and predict values for 2015 and when it exceeds \$4000B.

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Problem 38912

Find (gf)(3)\left(\frac{g}{f}\right)(3) where g(a)=3a+2g(a)=3a+2 and f(a)=2a4f(a)=2a-4.

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Problem 38913

Determine if 0.07 is less than or greater than 0.7: use << or >>.

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Problem 38914

How many real zeros can a quadratic function have? A quadratic can have 0, 1, or 2 real zeros. Choose the correct option.

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Problem 38915

Determine the correct symbol (>,<,=>,<,=) for the inequality: 713?0.54\frac{7}{13} ? 0.54.

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Problem 38916

Insert <,><,>, or == to make the statement true: 9559 - |-5| \square |-5|

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Problem 38917

Calculate 1517\frac{1}{5}-\frac{1}{7}.

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Problem 38918

Graph the line for the equation y=2x+1y=2x+1.

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Problem 38919

Insert <,z,<_{,} z_{,} or == in the blank to make a true statement: 343\frac{3}{4} \square|-3|

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Problem 38920

Calculate: 35110=\frac{3}{5}-\frac{1}{10}=

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Problem 38921

Insert << or >> between the numbers to make the statement true: 71178\frac{7}{11} \square \frac{7}{8}.

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Problem 38922

Insert <,><,>, or == to make the statement true: 111111111÷111 \frac{1}{11} \cdot \frac{1}{11} \square \frac{1}{11} \div \frac{1}{11}

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Problem 38923

Find the zeros of the function f(x)=x214xf(x)=x^{2}-14x by factoring. What are the xx-intercepts?

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Problem 38924

Insert << or >> between 78\frac{7}{8} and 79\frac{7}{9} to make the statement true: 7879\frac{7}{8} \square \frac{7}{9}.

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Problem 38925

Find the zeros of the function F(x)=x2+x30F(x)=x^{2}+x-30 by factoring. What are the xx-intercepts?

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Problem 38926

Calculate 910+29\frac{9}{10}+\frac{2}{9}.

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Problem 38927

Find the absolute value of -3: 3=|-3| =

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Problem 38928

Find the missing base of a trapezoid with height 3 in, known base 8 in, and area 21 sq in.

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Problem 38929

Calculate 47+16\frac{4}{7}+\frac{1}{6}.

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Problem 38930

Find the zeros of the function F(x)=x2x20F(x)=x^{2}-x-20 by factoring. What are the xx-intercepts?

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Problem 38931

Insert << or >> in the blank to make a true statement: 0.40.60.4 \square 0.6.

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Problem 38932

A grocer gives out 50 salad samples. She gave out 5 fewer than half the total samples. Find the total number of samples prepared.

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Problem 38933

Simplify -|92|. What is -|92| equal to?

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Problem 38934

Amelia has 6 feet of wire. How many necklaces can she make if each requires 13\frac{1}{3} foot? (A) 18 (B) 16 (C) 36 (D) 42

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Problem 38935

Insert << or >> in the shaded areas: a) 6 ___ 15, b) -6 ___ -15.

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Problem 38936

A solution has a volume of 90 mL after adding acid. It is 3 mL more than 3 times the original volume. Find the original volume.

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Problem 38937

Insert << or >> to make this true: -0.023 ___ -0.008.

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Problem 38938

Find the zeros of P(x)=3x248P(x)=3x^{2}-48 by factoring. What are the xx-intercepts? A or B: fill in the answers.

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Problem 38939

Find the zeros of the function f(x)=x212f(x)=x^{2}-12 using the square root method. What are the xx-intercepts?

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Problem 38940

Find the value of CC in the probability distribution where p(0)=0.1p(0)=0.1, p(1)=0.3p(1)=0.3, p(2)=Cp(2)=C, p(3)=0.2p(3)=0.2.

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Problem 38941

Three students raced 100m. Order their times: Tiana: 13.1s, James: 1×10+3×1+2×(110)1 \times 10+3 \times 1+2 \times\left(\frac{1}{10}\right), Dakota: twelve and nine tenths. Options: (A) (B) (C) (D).

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Problem 38942

A diver's final score is 77.7. If SS is 52, find the degree of difficulty DD using 0.6SD=77.70.6 * S * D = 77.7.

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Problem 38943

Is there a link between liking a TV show and viewer age? (a) Find expected adults who dislike: 20.1320.13. (b) Calculate χ2\chi^{2} test statistic: χ2=(observedexpected)2expected\chi^{2}=\sum \frac{(observed - expected)^{2}}{expected}.

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Problem 38944

What is the cutting speed of 80 feet per minute in cm per minute? Choose from: 800, 38, 960, 2438.4.

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Problem 38945

Find the missing probability p(2)=Cp(2) = C in the distribution: p(0)=0.1p(0)=0.1, p(1)=0.3p(1)=0.3, p(3)=0.2p(3)=0.2.

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Problem 38946

Find the zeros of f(x)=x220f(x)=x^{2}-20 using the square root method. What are the x-intercepts?

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Problem 38947

Convert the length of a part from 1257 mm1257 \mathrm{~mm} to meters. What is the length in meters?

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Problem 38948

A nickel absorbs 74 J74 \mathrm{~J} from water cooling from 65.5C65.5^{\circ} \mathrm{C} to 63.4C63.4^{\circ} \mathrm{C}. Find mass of water: CH2O=4.18JgC, mH2O=[?]g\mathrm{C}_{\mathrm{H}_{2} \mathrm{O}}=4.18 \frac{\mathrm{J}}{\mathrm{g} \cdot{ }^{\circ} \mathrm{C}}, \mathrm{~m}_{\mathrm{H}_{2} \mathrm{O}}=[?] \mathrm{g}

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Problem 38949

What is the quotient of 5÷145 \div \frac{1}{4}? (A) 54\frac{5}{4} (B) 64\frac{6}{4} (C) 20 (D) 21

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Problem 38950

A right triangle has legs where the long leg is 97 ft longer than the short leg, and the hypotenuse is 113 ft. Find the leg lengths.

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Problem 38951

Find the multiplier to convert inches to centimeters using 25.4, 0.03937, 2.54, and 10. Explain their relevance.

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Problem 38952

Convert the tolerance range of ±0.05\pm0.05 mm to the nearest 0.001 inch.

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Problem 38953

Convert 12 cubic inches of material removed to cubic centimeters. Options: 196.38, 1966, 16.38, 163.8.

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Problem 38954

Create an expression for "the product of 8 and the sum of a number xx and 3".

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Problem 38955

Find the value of CC for a probability distribution where p(0)=0.1p(0)=0.1, p(1)=0.3p(1)=0.3, p(3)=0.2p(3)=0.2, and p(2)=Cp(2)=C such that p(x)=1\sum p(x) = 1.

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Problem 38956

Find the zeros of f(x)=x275f(x)=x^{2}-75 using the square root method. What are the xx-intercepts?

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Problem 38957

Find the zeros of the function f(x)=x212f(x)=x^{2}-12 using the square root method. What are the xx-intercepts?

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Problem 38958

Rewrite each algebraic expression as a verbal phrase. Examples include:
1. 4q4 q
2. 18y\frac{1}{8} y
3. 15+r15+r
4. w24w-24
5. 3x23 x^{2}
6. 19\frac{1}{9}
7. 2a+62 a+6
8. r4t3r^{4} \cdot t^{3}
9. 25+6x225+6 x^{2}
10. 6f2+5f6 f^{2}+5 f
11. 3a52\frac{3 a^{5}}{2}
12. 9(a21)9(a^{2}-1)
13. 5g65 g^{6}
14. (c2)d(c-2) d
15. 45h4-5 h
16. 2b22 b^{2}
17. 7x317 x^{3}-1
18. p4+6rp^{4}+6 r
19. 3n2x3 n^{2}-x
20. (2+5)p(2+5) p
21. 18(p+5)18(p+5)

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Problem 38959

Find the simplified expression for the sum of (3x3)(3x - 3) and (4x9)(-4x - 9).

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Problem 38960

Lauren sells tacos (3.253.25 each) and burritos (7.757.75 each). If she sells 72 burritos, find possible taco sales to reach \$710.

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Problem 38961

Convert the tolerance +/.125+/-.125 inch to mm, rounded to the nearest 1/1001/100 mm: 33 mm, 1.251.25 mm, 3.173.17 mm, or 0.050.05 mm?

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Problem 38962

Calculate 612×3346 \frac{1}{2} \times 3 \frac{3}{4}. Choose the correct answer from the options: (A) 165816 \frac{5}{8}, (B) 183818 \frac{3}{8}, (C) 221222 \frac{1}{2}, (D) 243824 \frac{3}{8}.

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Problem 38963

Calculate the decimal approximation for sin4448\sin 44^{\circ} 48^{\prime}.

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Problem 38964

Find the least common denominator (LCD) of 13\frac{1}{3} and 14\frac{1}{4}.

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Problem 38965

Find the missing values in the area model for the expression 10(8w+10)10(8w + 10).

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Problem 38966

Find the zeros of g(x)=(x2)236g(x)=(x-2)^{2}-36 using the square root method. What are the x-intercepts?

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Problem 38967

Fill in the missing prefix or exponent in the following conversions: 1nN=10N1 \mathrm{nN} = 10 \square \mathrm{N}, 1N=106 N1 \square \mathrm{N} = 10^{6} \mathrm{~N}, 1N=103 N1 \square \mathrm{N} = 10^{3} \mathrm{~N}, 1cN=10N1 \mathrm{c} \mathrm{N} = 10^{\mathrm{N}}.

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Problem 38968

Convert 0.0625 inch to mm. Options: 1.58, 0.002, 6.25, 0.625.

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Problem 38969

Convert 2.73 cm2.73 \mathrm{~cm} to inches: 0.1074, 1.0704, 01074, or 107.4 inches?

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Problem 38970

Find the Least Common Denominator (LCD) of 13\frac{1}{3} and 14\frac{1}{4}.

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Problem 38971

Calculate the decimal approximation of the trigonometric function: sin(31018)\sin \left(-310^{\circ} 18^{\prime}\right) \approx (round to 8 decimal places).

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Problem 38972

Convert these fractions to the least common denominator: 13\frac{1}{3}, 14\frac{1}{4}. Choose the equivalent from: a. 812\frac{8}{12}, b. 912\frac{9}{12}, c. 312\frac{3}{12}, d. 612\frac{6}{12}, e. 412\frac{4}{12}.

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Problem 38973

Find the missing values in the area model for the expression 0(8w+10)0(8w + 10).

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Problem 38974

Find the least common denominator (LCD) for 12\frac{1}{2} and 38\frac{3}{8}. Choices: 4, 8, 2, 16, 24.

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Problem 38975

Create an expression for 250 minutes left if you talk 1 hour (60 minutes) per week: 25060w250 - 60w, where ww is weeks.

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Problem 38976

Find the real zeros of the function f(x)=x2+8x+14f(x)=x^{2}+8x+14 using the quadratic formula. What are the xx-intercepts?

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Problem 38977

Convert 17.27 cm17.27 \mathrm{~cm} to inches. Options: 43.865, 6.799, 172.7, 0.06799.

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Problem 38978

Fill in the missing prefix or exponent:
1Pa=106 Pa1 \square \mathrm{Pa}=10^{6} \mathrm{~Pa}, 1cPa=10Pa1 \mathrm{c} \mathrm{Pa}=10^{\mathrm{Pa}}, 1Pa=101 Pa1 \square \mathrm{Pa}=10^{-1} \mathrm{~Pa}, 1kPa=10Pa1 \mathrm{kPa}=10^{\mathrm{Pa}}.

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Problem 38979

Identify the experiment that is NOT a continuous probability function: weight of a widget, rollercoaster height, truck length, balloon pressure, quiz time.

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Problem 38980

For a Standard Normal Variable, find P(0.58<z<1.74)P(0.58<z<1.74) using the provided tables.

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Problem 38981

What score does Jane need on her fifth math test to achieve a mean of 90, given her first four grades: 88,92,86,8488, 92, 86, 84?

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Problem 38982

Find the real zeros of the function f(x)=x2+10x+20f(x)=x^{2}+10x+20 using the quadratic formula. What are the x-intercepts?

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Problem 38983

Find the area of a rectangle with length 34ft\frac{3}{4} \mathrm{ft} and width 23ft\frac{2}{3} \mathrm{ft}.

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Problem 38984

Simplify the expression: 0.5xx0.5 x - x.

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Problem 38985

Given heights of 200 fir trees, create a cumulative frequency table, curve, and estimate median, IQR, mean, SD, and variance.

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Problem 38986

Kadeem has \$9 and buys 7 cookies at \$0.50. How many donuts can he buy if he needs at least 10 total treats?

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Problem 38987

Fill in the missing prefix or exponent for these pressure conversions:
1μPa=10Pa1 \mu \mathrm{Pa} = 10^{\square} \mathrm{Pa}, 1Pa=109Pa1 \square \mathrm{Pa} = 10^{-9} \mathrm{Pa}, 1kPa=10Pa1 \mathrm{k} \mathrm{Pa} = 10^{\square} \mathrm{Pa}, 1Pa=106Pa1 \square \mathrm{Pa} = 10^{6} \mathrm{Pa}.

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Problem 38988

Simplify 5aa5a - a where "a" is a variable.

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Problem 38989

Count the significant digits in these measurements: 8.0×101 kJ/mol-8.0 \times 10^{-1} \mathrm{~kJ/mol}, 0.007500 J0.007500 \mathrm{~J}, 3.3×103 mL3.3 \times 10^{-3} \mathrm{~mL}, 40400 kg40400 \mathrm{~kg}.

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Problem 38990

Calculate the probability P(0.58<z<1.74)\mathrm{P}(0.58<\mathrm{z}<1.74) for a Standard Normal Random Variable using the provided tables.

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Problem 38991

Let f(x)=x2+xf(x)=\sqrt{x^{2}+x} for 1x71 \leq x \leq 7. We wish to estimate 17f(x)dx\int_{1}^{7} f(x) d x by the Trapezoidal Rule. a) Divide the domain of ff into 4 sub-intervals of equal length. Calculate their common length Δx\Delta x (exact value). b) Find the approximation of 17f(x)dx\int_{1}^{7} f(x) d x that the Trapezoidal Rule produces with 4 sub-intervals. Give the answer with ±0.0001\pm 0.0001 precision. Number

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Problem 38992

25 Graph f(x)=x+1f(x)=|x+1| on the set of axes below.

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Problem 38993

10. A fruit fly is an F1F_{1} offspring of two true-breeding parents for body color and wing length (GGLL ×\times ggll). The F1F_{1} fly is a heterozygote for both gray body and long wings (GgLI). The heterozygous fly mates with a beautiful female that is stunningly homozygous recessive for body color (black) but homozygous dominant for wing length (long). What are the phenotypes and genotypic ratio of the F2\mathrm{F}_{2} offspring from this mating? Remember that the genes for body color and wing length are linked! F2F_{2} phenotypes: \qquad \qquad F2F_{2} genotypic ratio: \qquad

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Problem 38994

Solve: 4v+1<5|4 v+1|<5
Write your answers exactly (no decimals) in interval notation Question Help: Post to forum

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Problem 38995

Si représente 1 et que la couleur jaune représente des quantités négatives, détermine l'opposé de l'expression représentée par chacun de ces schémas. Exprime tes réponses avec des schémas et des symboles. a) b)

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Problem 38996

Antall passasjerer med KLM som flyr Business-class er på ca 20000 persont i året. Dette antallet har avtatt med 12%12 \% for hvert år de siste årene. Vi antar at dette antallet vil fortsette å synke med 12%12 \% i året hvert år fremover. a. Hvor mange vil reise på Business Class om fire år? Avrund til nærmeste heltall. b. Hvor mange reiste på KLM Business Class for fem år siden? Avrund til nærmeste heltall.

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Problem 38997

14. [0.5/1 Points] DETAILS MY NOTES SCALC9 5.3.064. PREVIOUS ANSWERS ASK YOUR TEACHER PRACTICE ANOTHER
Suppose you make napkin rings by drilling holes with different diameters through two wooden balls (which also have different diameters). You discover that both napkin rings have the same height ih, as shown in the figure. (Let a=7a=7.) (a) Which ring has more wood in it? The napkin ring created by drilling a hole with the larger radius has more wood in it. The amount of wood in each napkin ring is the same regardless of the size of the sphere used. The napkin ring created by drilling a hole with the smaller radius has more wood in it. (b) Use cylindrical shells to compute the volume VV of a napkin ring of height 7h7 h created by driling a hole with radius rr through the center of a sphere of radius RR and express the answer in terms of hh. v=v= \square
Need Help? Read It Submit Answer

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Problem 38998

Let f(x)=x2+xf(x)=\sqrt{x^{2}+x} for 1x71 \leq x \leq 7. We wish to estimate 17f(x)dx\int_{1}^{7} f(x) d x by the Trapezoidal Rule. a) Divide the domain of ff into 4 sub-intervals of equal length. Calculate their common length Δx\Delta x (exact value). 1.5 \square b) Find the approximation of 17f(x)dx\int_{1}^{7} f(x) d x that the Trapezoidal Rule produces with 4 sub-intervals. Give the answer with ±0.0001\pm 0.0001 precision. Number

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Problem 38999

The formula A=19.6e0.0139tA=19.6 e^{0.0139 t} models the population of a US state, A , in millions, t years after 2000. a. What was the population of the state in 2000 ? b. When will the population of the state reach 25.9 million? a. In 2000, the population of the state was \square million.

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Problem 39000

11. Quel est l'opposé de ces expressions? a) 3x73 x-7 b) 4g24g+2.54 g^{2}-4 g+2.5 c) v2+8v1v^{2}+8 v-1

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