Function

Problem 6101

Find the value of f(2)f(-2) if f(x)=4x+4f(x)=4x+4.

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Problem 6102

Evaluate f(x)=12xf(x)=\frac{1}{2} x for f(0)f(0), f(10)f(10), and f(10)f(-10). What are the results?

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Problem 6103

Find the value of g(0)g(0) for the function g(x)=4x2+2x+3g(x)=-4 x^{2}+2 x+3.

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Problem 6104

Find the price per bushel of corn using p(x)=6+0.08x+0.09x2p(x)=6+0.08 x+0.09 x^{2} for x=0x=0 to 55.

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Problem 6105

Next week, you charged \$9 per guest with 39 guests on average. Find:
(a) The linear demand equation q(p)=q(p)= (b) The revenue function R(p)=R(p)= (c) The cost function C(p)=25.5p+488C(p)=-25.5p+488

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Problem 6106

Find f(0)f(0) for the function f(x)=12xf(x)=\frac{1}{2} x.

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Problem 6107

Next week, you charge \$9 per guest with 39 guests on average.
(a) Find the demand equation q(p)=q(p)=. (b) Find revenue R(p)=R(p)=. (c) Given costs C(p)=25.5p+488C(p)=-25.5p+488, find profit P(p)=P(p)=. (d) Determine break-even entrance fees p=p= (two values, rounded to two decimals).

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Problem 6108

Given sales and prices for Q1 2009 and 2010, find the linear demand function q(p)q(p) and predict sales at \$75. For each \$1 price increase, how many units decrease?

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Problem 6109

Calculate the annual straight-line depreciation DD for an item costing \15,963withalifeof13years:15,963 with a life of 13 years: D=(1/n)x$.

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Problem 6110

Evaluate the function h(x)=x2h(x)=-x^{2} for: a. h(8)h(-8), b. h(12)h\left(-\frac{1}{2}\right), c. h(12)h\left(\frac{1}{2}\right).

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Problem 6111

Find values of the constant function f(x)=9f(x)=9: a. f(5)f(5), b. f(0)f(0), c. f(153)f(153). What are these values?

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Problem 6112

Evaluate the function f(x)=0.8x21.6x+5.3f(x)=0.8 x^{2}-1.6 x+5.3 at x=2x=2, x=2x=-2, and x=2.3x=2.3. What are the results?

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Problem 6113

Find the annual straight-line depreciation for an item costing \15,963withalifeof13years.Use15,963 with a life of 13 years. Use D=(1/n)x$.

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Problem 6114

Find the linear demand function for cell phones using the 2009 and 2010 data. Predict sales at \$156 and state the decrease per \$1 increase.
q(p)= q(p)=

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Problem 6115

Predict diamond production using f(x)=3.09x+148.37f(x)=-3.09 x+148.37 for 2026, where xx is years after 2017. Result: \$ \square billion.

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Problem 6116

Find the inverse function f1(x)f^{-1}(x) for f(x)=2x+16f(x) = 2x + 16. What is f1(x)f^{-1}(x)?

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Problem 6117

Find the cost to manufacture each additional Kinect using C(x)=150x+30C(x)=150x+30. Estimate the cost for 37 Kinects.

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Problem 6118

Find the inverse function f1(x)f^{-1}(x) if f(x)=x45f(x) = \frac{x}{4} - 5. What is f1(x)=[?]x+[]f^{-1}(x) = [?] x + []?

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Problem 6119

RideEm Bicycles can make 170 bikes for \$10,300 and 190 bikes for \$10,900.
(a) Find the cost function C(x)=C(x)=. (b) What are the fixed costs in dollars? (c) What are the variable costs in dollars?

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Problem 6120

Identify which function opens upward: y=2x2+x+3y=-2 x^{2}+x+3 or f(x)=0.5x2x1f(x)=0.5 x^{2}-x-1.

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Problem 6121

Identify which function opens downward: f(x)=0.5x210x110f(x)=0.5 x^{2}-10 x-110 or f(x)=x2+33xf(x)=-x^{2}+33 x.

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Problem 6122

Find the axis of symmetry for the function f(x)=2x23x+6f(x)=2 x^{2}-3 x+6 using x=b2ax=\frac{-b}{2 a}. What is the value?

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Problem 6123

Find the axis of symmetry for f(x)=8x2+6x+19f(x)=8 x^{2}+6 x+19 using x=b2ax=\frac{-b}{2 a}. Enter x=[?][][]x=[?] \frac{[]}{[]}.

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Problem 6124

Given \$7,500:
(a) Create a linear function for development fee pp based on contracts qq:
p(q)=
(b) Find total revenue RR from qq contracts:
R(q)=
(c) Monthly costs: Fixed: \150,000,Variable:$1,500q.Costfunction150,000, Variable: \$1,500q. Cost function C(q)=
(d) Profit function $P(q)=
(e) Find break-even contracts signed: ISeeYou breaks even at contracts.

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Problem 6125

Find the vertex of the function f(x)=(x+5)2+1f(x)=-(x+5)^{2}+1. Use vertex form y=a(xh)2+ky=a(x-h)^{2}+k.

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Problem 6126

Find the vertex of the quadratic function y=3(x5)2+8y=-3(x-5)^{2}+8. Use the vertex form y=a(xh)2+ky=a(x-h)^{2}+k.

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Problem 6127

Given the function f(x)=x22x3f(x) = x^{2} - 2x - 3, find missing values for f(x)f(x) in the table with xx values -1, 0, 1, 2, 3.

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Problem 6128

Factor the quadratic function f(x)=x2+14x+48f(x)=x^{2}+14x+48 and find the value of xx that fits: x=8;x=[?]x=-8 ; x=[?].

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Problem 6129

ISeeYou charges \$7,500.
(a) Create a linear function for the fee pp for qq contracts: p(q)=p(q)=. (b) Determine total revenue RR from qq contracts: R(q)=R(q)=. (c) Monthly costs: Fixed \150,000,Variable$1,500percontract.Findcostfunction:150,000, Variable \$1,500 per contract. Find cost function: C(q)=$.

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Problem 6130

A pebble falls from a height of 2,304ft2,304 \mathrm{ft}. Find the time tt when h(t)=16t2+2304=0h(t) = -16t^{2} + 2304 = 0.

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Problem 6131

Find the starting point of the function f(x)=x4+7f(x)=\sqrt{x-4}+7 on the coordinate plane. What is the ordered pair?

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Problem 6132

Find the inverse of the function f(x)=3x+9f(x)=3x+9. What is f1(x)=x[?]+f^{-1}(x)=\frac{x}{[?]}+?

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Problem 6133

Find the inverse function f1(x)f^{-1}(x) for f(x)=x9+1f(x) = \frac{x}{9} + 1. What is f1(x)=[?]x+[]f^{-1}(x) = [?] x + []?

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Problem 6134

Find the starting point of the function f(x)=x+22f(x)=\sqrt{x+2}-2 on the coordinate plane. ([?],[])([?],[])

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Problem 6135

Next week, you charged \$9 per guest with an average of 39 guests.
(a) Find the demand equation q(p)=q(p)=. (b) Find revenue R(p)=R(p)=. (c) Given C(p)=25.5p+488C(p)=-25.5p+488, find profit P(p)=P(p)=. (d) Determine break-even entrance fees, rounded to two decimal places.

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Problem 6136

Given cell phone sales and prices for Q1 2009 and 2010, find the demand function q(p)q(p). Predict sales at \$156. Also, determine the sales decrease per \$1 price increase.

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Problem 6137

Next week, you charged \$9 per guest with 39 guests on average.
(a) Find the demand equation q(p)=q(p)=. (b) Find the revenue function R(p)=R(p)=. (c) Given costs C(p)=25.5p+488C(p)=-25.5p+488, find profit P(p)=P(p)=. (d) Find break-even entrance fees, rounding to two decimal places.

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Problem 6138

Find the y-intercept of f(x)=x24x+2f(x)=\frac{x^{2}-4}{x+2}.

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Problem 6139

Determine the oblique asymptote for the function f(x)=x24x+2f(x)=\frac{x^{2}-4}{x+2}.

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Problem 6140

Determine the vertical asymptote of f(x)=x24x+2f(x)=\frac{x^{2}-4}{x+2}.

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Problem 6141

Determine the horizontal asymptote for the function f(x)=x24x+2f(x)=\frac{x^{2}-4}{x+2}.

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Problem 6142

Find the holes in the rational function f(x)=x24x+2f(x)=\frac{x^{2}-4}{x+2}. If none, state 'none'.

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Problem 6143

Next week, you charge \$9 per guest with 39 guests on average.
(a) Find the demand equation q(p)=q(p)=. (b) Find revenue R(p)=R(p)=. (c) Costs C(p)=25.5p+488C(p)=-25.5p+488, find profit P(p)=P(p)=. (d) Determine break-even entrance fees p=p=.

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Problem 6144

Calculate the value of log5125\log _{5} 125.

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Problem 6145

Find the derivative of f(x)=5x2f(x) = 5x^2.

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Problem 6146

Evaluate log325\log _{3} 25 using the Change-of-Base Formula and round to two decimal places.

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Problem 6147

RideEm Bicycles produces 170 bikes for \10,300and190bikesfor$10,900.Findthecostfunction10,300 and 190 bikes for \$10,900. Find the cost function C(x)$ and fixed/variable costs.

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Problem 6148

Find the domain of the function f(x)=log3(x9)2f(x)=\log _{3}(x-9)^{2}.

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Problem 6149

Calculate the value of log8164\log _{8} \frac{1}{64}.

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Problem 6150

Find the exact value of lne\ln \mathrm{e}.

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Problem 6151

Determine the domain of the function f(x)=log(x+6)f(x)=\log (x+6).

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Problem 6152

Combine the logarithms: logcq+logcr\log_{c} q + \log_{c} r as a single logarithm.

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Problem 6153

Find points A, B, and C on y=36x2y=\frac{\sqrt{3}}{6} x^{2} such that OPA=OPB=30\angle OPA = \angle OPB = 30^{\circ} and ABC=60\angle ABC = 60^{\circ}.

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Problem 6154

原点Oと点P(-3/2, 0)があり、曲線y=36x2y=\frac{\sqrt{3}}{6} x^{2}上の点A, B, Cを求める問題。 (1) A, B, Cの座標 (2) 円の中心座標 (3) Bの接線の式 (4) Bのみが両方にあることを示せ。

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Problem 6155

Find the xx intercept(s) of the function f(x)=2x28x+6f(x)=2 x^{2}-8 x+6.

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Problem 6156

Show that f(x)=x26x+1f(x)=x^{2}-6x+1 on [1,3] meets Lagrange's theorem. Find where the tangent is parallel to the line joining A(1,-4) and B(3,-8).

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Problem 6157

How much do 11 toy parts cost if 2 parts are \$0.90, 7 parts are \$3.15, 12 parts are \$5.40, and 15 parts are \$6.75?

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Problem 6158

Find the derivative of y=x2+3(4x2+2)4y=x^{2}+3(4x^{2}+2)^{4}.

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Problem 6159

For the function f(x)=x2+4xf(x)=x^{2}+4 x, find its vertex, axis of symmetry, and intercepts. Does it open up or down?

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Problem 6160

Analyze the function f(x)=x2+8xf(x)=x^{2}+8x: find if it opens up/down, vertex, axis of symmetry, yy-intercept, and xx-intercepts.

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Problem 6161

Find x-intercepts, y-intercept, domain, range of f(x)=x2+4xf(x) = x^2 + 4x, and graph the function.

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Problem 6162

Graph the quadratic function f(x)=x2+8xf(x)=x^{2}+8x: find vertex, axis of symmetry, yy-intercept, and xx-intercepts. Does it open up or down?

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Problem 6163

For the function f(x)=x28xf(x)=x^{2}-8x, find the x-intercepts and y-intercept. What are they?

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Problem 6164

For the function f(x)=x28xf(x)=x^{2}-8 x, determine if it opens up or down, and find its vertex and intercepts.

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Problem 6165

Miss Ma's income rises by 6% from \$420000. Calculate the percentage change in her salaries tax payable with fixed allowances.

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Problem 6166

Find the 2014 annual rates for a flat with a 2.5% yearly increase, starting from \$5200 per quarter in 2008.

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Problem 6167

Miss Lee's tax is \$4500. Find her net chargeable income using the tax rates: 2\% for \$40000, 7\% for next \$40000, 12\% for next \$40000, and 17\% for the rest. Round to the nearest dollar.

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Problem 6168

Find the derivatives of these functions: 1. y=exy=e^{-x}, 2. y=ex+1y=e^{x+1}, 3. y=1e5xy=\frac{1}{e^{5x}}.

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Problem 6169

For the function f(x)=x2+8xf(x)=-x^{2}+8x, find its vertex, axis of symmetry, and intercepts. Does it open up or down?

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Problem 6170

Dimitri's car gets 21 miles/gallon with a 12-gallon tank. Can he drive 202.4 miles? Show calculations and use dimensional analysis.

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Problem 6171

For the function f(x)=x2+8xf(x)=-x^{2}+8x, find the yy-intercept and state the domain and range in interval notation.

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Problem 6172

Analyze the function L=2cos(x)+1L = 2\cos(x) + 1 and describe its general behavior.

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Problem 6173

Graph the function f(x)=x2+6xf(x)=-x^{2}+6x: determine if it opens up or down, and find the vertex, axis of symmetry, yy-intercept, and xx-intercepts.

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Problem 6174

For the function f(x)=x2+8xf(x)=-x^{2}+8x, find the xx-intercepts, yy-intercept, domain, and range.

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Problem 6175

A car worth \22,500decreasesby$3200peryearfor6years.Define22,500 decreases by \$3200 per year for 6 years. Define V(x)for for 0 \leq x \leq 6andfind and find V(3)$.

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Problem 6176

Graph the pool emptying rate function to find the time to empty it. Transform f(x)=x1+3f(x) = |x - 1| + 3 with a horizontal shrink by 13\frac{1}{3}.

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Problem 6177

Explain how the function f(x)=2x+3f(x)=2|x+3| transforms from its parent function. (10 points)

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Problem 6178

Is the cost of copies (5.20,5.20, 6.50, $9.76) proportional to the number of copies (260, 325, 488)? Predict cost for 600 copies.

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Problem 6179

Is the cost of copies proportional to the number? If yes, find cost for 600 copies; if no, write NO SOLUTION.

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Problem 6180

Find the tangent line equation for the function f(x)=exln(x)f(x)=e^{-x} \ln (x) at the point (1,0)(1,0).

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Problem 6181

Is the Celsius temperature proportional to Fahrenheit? Use the formula F=95C+32F = \frac{9}{5}C + 32 for conversion.

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Problem 6182

Evaluate: 4. 6(12+4)6(12+4), 5. 10+4(10+4(; Decompose each rectangle into smaller rectangles.

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Problem 6183

Find the inverse function f1(x)f^{-1}(x) for f(x)=4x+65x+3f(x)=\frac{4 x+6}{5 x+3}.

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Problem 6184

Find the inverse function f1(x)f^{-1}(x) for f(x)=2x+3x5f(x)=\frac{2x+3}{x-5}.

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Problem 6185

Is the fee for ride tickets proportional to the number of tickets? Analyze the values for 5,10,15,205, 10, 15, 20 tickets.

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Problem 6186

Evaluate the piecewise function f(x)={3x+5 if x<04x+7 if x0f(x)=\left\{\begin{array}{lll}3 x+5 & \text { if } & x<0 \\ 4 x+7 & \text { if } & x \geq 0\end{array}\right. for f(2)f(-2), f(0)f(0), and f(3)f(3).

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Problem 6187

Calculate the atomic mass of chlorine given isotopes: 91.51%91.51\% of 35Cl{ }^{35} \mathrm{Cl} (34.97amu34.97 \mathrm{amu}) and 24.57%24.57\% of 37Cl{ }^{37} \mathrm{Cl} (36.97amu36.97 \mathrm{amu}).

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Problem 6188

Find a domain where the function f(x)=x29f(x)=x^{2}-9 is one-to-one and non-decreasing, then find its inverse.

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Problem 6189

Calculate the time (in years) for R7 520 to grow to R9 841,80 at a simple interest rate of 9,5%9,5 \%. Options: a. 0,33 b. 13,78 c. 2,48 d. 3,25.

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Problem 6190

A firm needs to deposit now to pay R6,285 per coffee machine in 4 months with 8%8\% annual simple interest. How much?

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Problem 6191

What is the horizontal change between two points on a line? A. Run B. Rise C. Height D. Altitude

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Problem 6192

Graph f(x)=x28xf(x) = -x^2 - 8x: Determine if it opens up/down, find vertex, axis of symmetry, yy-intercept, and xx-intercepts.

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Problem 6193

This table contains a pattern. A two row table is shown. \begin{tabular}{|l|l|l|l|l|l|} \hline Bicycles & 1 & 2 & 3 & 4 & 5 \\ \hline Wheels & 2 & 4 & 6 & & \\ \hline \end{tabular}
What 2 numbers will correctly extend the pattern?

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Problem 6194

Your answer is incorrect. The area covered by a certain population of bacteria increases according to a continuous exponential growth model. Suppose that a sample culture has an initial area of 5.6 mm25.6 \mathrm{~mm}^{2} and an observed doubling time of 5 minutes. (a) Let tt be the time (in minutes) passed, and let yy be the area of the sample at time tt. Write a formula relating yy to tt. Use exact expressions to fill in the missing parts of the formula. Do not use approximations. y=5.6e(ln25)ty=5.6 e^{\left(\frac{\ln 2}{5}\right) t} (b) What will the area of the sample be in 22 minutes?
Do not round any intermediate computations, and round your answer to the nearest tenth. 179.2 mm2179.2 \mathrm{~mm}^{2}

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Problem 6195

(c) You are given the point (3,2)(3,2) in polar coordinates. (i) Find another pair of polar coordinates for this point such that r>0r>0 and 2πθ<4π2 \pi \leq \theta<4 \pi. r=r= θ=\theta= (ii) Find another pair of polar coordinates for this point such that r<0r<0 and 0θ<2π0 \leq \theta<2 \pi. r=θ=\begin{array}{c} r= \\ \theta= \end{array}

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Problem 6196

The logistic growth function P(x)=901+271e0.122x\mathrm{P}(\mathrm{x})=\frac{90}{1+271 e^{-0.122 x}} models the percentage, P(x)\mathrm{P}(\mathrm{x}), of Americans who are x years old and have some coronary heart disease. Use this function to find the age at which the percentage of Americans who have some coronary heart disease is 49%49 \%.
What is the age at which 49%49 \% of Americans have some coronary heart disease? \square years old (Round to the nearest integer.)

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Problem 6197

Short Answer
6. a) Determine the slope of the line that passes through the point: (2,3)(-2,-3) and (5,4)(5,4).

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Problem 6198

ng and reasoning. MEDIUM O Write a sinusoidal equation that has the following characteristics: The midline is at y = 5 The length of one period is 60° y= 4 sin ②x-60°).

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Problem 6199

List the critical numbers of the following function in increasing order. Enter N in any blank that you don't need to use. f(θ)=4cos(θ)+2sin2(θ),πθπf(\theta)=4 \cos (\theta)+2 \sin ^{2}(\theta),-\pi \leq \theta \leq \pi \square

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Problem 6200

\begin{align*} \text{Pour l'équation } y = -3 \cos \left(2\left(x + 45^{\circ}\right)\right) + 2, \\ \text{trouver les valeurs de BERT qui permettent de tracer le graphique.} \\ \text{Donnez les nombres exacts pour chaque B, E, R, T.} \end{align*}

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