Math Statement

Problem 2301

Factor f(x)f(x) into linear factors given that kk is a zero of f(x)f(x). f(x)=3x3+2x217x+12;k=1f(x)=3 x^{3}+2 x^{2}-17 x+12 ; k=1 f(x)=f(x)= \square (Factor completely.)

See Solution

Problem 2302

Suppose AA and BB are independent events. If P(A)=0.4P(A)=0.4 and P(B)=0.9P(B)=0.9, what is P(AB)P\left(A^{\prime} \cap B\right) ? A. 0.04 B. 0.36 C. 0.06 D. 0.54

See Solution

Problem 2303

ALGEBRA II
3. If log(n)=0.6\log (n)=0.6, find the value of log(10n)\log (10 n).
4. If mm is a positive integer and log(m)3.8\log (m) \approx 3.8, how many digits are there in mm ? Explain how you know.
5. If mm is a positive integer and log(m)9.6\log (m) \approx 9.6, how many digits are there in mm ? Explain how you know.
6. Vivian says log(452000)=5+log(4.52)\log (452000)=5+\log (4.52), while her sister Lillian says that log(452000)=6+log(0.452)\log (452000)=6+\log (0.452). Which sister is correct? Explain how you know.

See Solution

Problem 2304

Rearrange the equation 2r+1.6b=102r + 1.6b = 10 so that rr is the independent variable.

See Solution

Problem 2305

32+32\frac{\sqrt{3}}{2}+\frac{\sqrt{3}}{2}

See Solution

Problem 2306

1) 12a39a2+4a312 a^{3}-9 a^{2}+4 a-3 2) 2p3+5p2+6p+152 p^{3}+5 p^{2}+6 p+15 3) 3n34n2+9n123 n^{3}-4 n^{2}+9 n-12 4) 12n3+4n2+3n+112 n^{3}+4 n^{2}+3 n+1 5) m3m2+2m2m^{3}-m^{2}+2 m-2 6) 5n310n2+3n65 n^{3}-10 n^{2}+3 n-6 7) 35xy5x56y+835 x y-5 x-56 y+8 8) 224az+56ac84yz21yc224 a z+56 a c-84 y z-21 y c 9) mnz5mh25nz+25nh2m n z-5 m h^{2}-5 n z+25 n h^{2}

See Solution

Problem 2307

Which expression completes the statement to form a true equation? 2+42=2+4^{2}= 252^{5} 929^{2} 23+92^{3}+9 32+93^{2}+9

See Solution

Problem 2308

Solve for vv. 74v85=23\frac{7}{4} v-\frac{8}{5}=-\frac{2}{3}
Simplify your answer as much as possible. v=v=

See Solution

Problem 2309

ii) Discutere l'esistenza del limite per n+n \rightarrow+\infty della successione (an)n\left(a_{n}\right)_{n} definita per ricorrenza da {a0=12an+1=anan5,n0\left\{\begin{array}{l} a_{0}=\frac{1}{2} \\ a_{n+1}=a_{n}-a_{n}^{5}, \quad n \geq 0 \end{array}\right.
Se la successione (an)n\left(a_{n}\right)_{n} è regolare, determinare limn+an\lim _{n \rightarrow+\infty} a_{n}.

See Solution

Problem 2310

f(x)={x2+6x+7 if x<1x+3 if 1x<35 if x3}f(2)=(2)+3=1f(1)=f(7)=f(3)=\begin{array}{l}f(x)=\left\{\begin{array}{lr}x^{2}+6 x+7 & \text { if } x<-1 \\ -x+3 & \text { if }-1 \leq x<3 \\ 5 & \text { if } x \geq 3\end{array}\right\} \\ f(2)=-(2)+3=1 \\ f(-1)= \\ f(-7)= \\ f(3)=\end{array}

See Solution

Problem 2311

Determine the value(s) of bb that ensure 5x2+bx+5=05 x^{2}+b x+5=0 has two non-real solutions.

See Solution

Problem 2312

y=3x3y=3 \sqrt[3]{x}
Domain: Range: Increasing: Decreasing: End Behavior:
Transformations:

See Solution

Problem 2313

Find the conjugate then determine in a + bi form the solution to (5i)(5+i)\frac{(5-i)}{(5+i)} (51)/23(5-1) / 23 (135i)/13(13-5 i) / 13 (5+i)/13(5+i) / 13 (53i)/13(5-3 i) / 13 (1i)/10(1-i) / 10

See Solution

Problem 2314

5) y=3x3y=3 \sqrt[3]{x}
Domain: Range: Increasing: Decreasing: End Behavior:
Transformations: y=x13y=-\sqrt[3]{x-1}

See Solution

Problem 2315

Divide 5 by 2\sqrt{ } 2. 2.5 10 5/25 / \sqrt{2} 10\sqrt{ } 10

See Solution

Problem 2316

Factor 4x2+12x+94x^2 + 12x + 9.

See Solution

Problem 2317

Determine the greatest common factor of (8y2+64)\left(8 y^{2}+64\right) 4 4y4 y 8 8y8 y

See Solution

Problem 2318

ELIMINATION y=3x1y+x=3\begin{array}{l} y=3 x-1 \\ y+x=3 \end{array}

See Solution

Problem 2319

Graph the quadratic function f(x)=x2+8x17f(x)=-x^{2}+8 x-17. Give the (a) vertex, (b) axis, (c) domain, and (d) range. (a) The vertex is \square

See Solution

Problem 2320

If lna=2,lnb=3\ln a=2, \ln b=3, and lnc=5\ln c=5, evaluate the following: (a) ln(a3b3c3)=\ln \left(\frac{a^{3}}{b^{3} c^{3}}\right)= \square (b) lna1b4c3=\ln \sqrt{a^{1} b^{4} c^{3}}= \square

See Solution

Problem 2321

Given h(x)=3x+4h(x)=3 x+4, find h(1)h(-1)

See Solution

Problem 2322

Simplify the expression: log(7x+6)logx\log (7x+6) - \log x as a single logarithm.

See Solution

Problem 2323

Soit ff la fonction numérique définie par: f(x)={1+x1lnx, si x<0(x2+2x)ex+ex, si x0f(x)=\left\{\begin{array}{ll}1+\frac{x-1}{\ln |x|} & \text {, si } x<0 \\ \left(x^{2}+2 x\right) e^{-x}+e^{-x} & , \text { si } x \geq 0\end{array}\right. On note CfC_{f} la courbe représentative de ff.
1. Déterminer le domaine de définition de ff.
2. Etudier la continuité et la dérivabilité de ff en 0 .
3. Etudier les variations de ff puis dresser son tableau de variation.
4. Etudier les branches infinies de ff.
5. Vérifier que : f(α)=α+1f(\alpha)=\alpha+1.
6. Construire la courbe CfC_{f}.

See Solution

Problem 2324

12. Determine the equation(s) of the vertical asymptote(s) of the function y=0.9x2x23:y=\frac{0.9^{x}}{2 x^{2}-3}: \checkmark \checkmark \checkmark

See Solution

Problem 2325

Evaluate ln(183.1)\ln (183.1). Give your answer to 4 decimal places. ln(183.1)=\ln (183.1)= \square Question Help: Video Message instructor Calculator

See Solution

Problem 2326

The function h=16t2+1900h=-16 t^{2}+1900 gives an object's height hh, in feet, at tt seconds. a. What does the constant 1900 tell you about the height of the object? b. What does the coefficient of t2\mathrm{t}^{2} tell you about the direction the object is moving? c. When will the object be 1300 ft above the ground? d. When will the object be 910 ft above the ground? e. What is a reasonable domain and range for the function hh ?

See Solution

Problem 2327

Question Watch Video
Perform the operation and reduce the answer fully. 9476\frac{9}{4}-\frac{7}{6}

See Solution

Problem 2328

Perform the indicated operation and reduce the answer to lowest terms.
1. 3x22x+110x+112x4\frac{3 x^{2}}{2 x+1} \cdot \frac{10 x+1}{12 x^{4}}

See Solution

Problem 2329

Question
Perform the operation and reduce the answer fully. 43+92\frac{4}{3}+\frac{9}{2}

See Solution

Problem 2330

Write the equation in logarithmic form. Assume that all constants are positive and not equal to 1. 10z=n10^{z}=n \square Hint

See Solution

Problem 2331

(ab)x+(a+b)x=2a2+2ab(a-b) x+(a+b) x=2 a^{2}+2 a b

See Solution

Problem 2332

2log8xlog8(x7)=132 \log _{8} \sqrt{x}-\log _{8}(x-7)=\frac{1}{3}

See Solution

Problem 2333

Exponential Decay Given that a quantity Q(t)Q(t) exhibiting exponential decay is described by the function Q(t)=1900e0.03tQ(t)=1900 e^{-0.03 t} where tt is measured in years, answer the following questions. (a) What is the decay constant kk ? k=0.03 Terrific! k=0.03 \quad \text { Terrific! } (b) What quantity is present initially? 1900 units 1900 \sim \sim \text { units } (c) Complete the following table of values. (Round your answers to the nearest whole number.) \begin{tabular}{|c|c|} \hline t & Q \\ \hline 0 & 1900 Awesome job! \\ \hline 5 & How might you evaluate Q(t)Q(t) for the given value of tt ? Click the Read It link to review the concepts you need. \\ \hline 10 & How might you evaluate Q(t)Q(t) for the given value of tt ? Click the Read It link to review the concepts you need. \\ \hline 20 & How might you evaluate Q(t)Q(t) for the given value of tt ? Click the Read It link to review the concepts you need. \\ \hline 100 & \\ \hline \end{tabular}

See Solution

Problem 2334

NYA Module 6: Problem 1 (1 point)
The function f(x)=4x3+24x236x2f(x)=-4 x^{3}+24 x^{2}-36 x-2 is increasing on the interval ( 1,3 ). It is decreasing on the interval ((-\infty, \square ) and the interval ( \square , \infty ).
The function has a local maximum at \square
Note: You can earn partial credit on this problem. Preview My Answers Submit Answers
You have attempted this problem 0 times. You have unlimited attempts remaining.

See Solution

Problem 2335

Use graphing technology to find the domain of the function f(x)=(x+5)21f(x)=-(x+5)^{2}-1.

See Solution

Problem 2336

Find the following trigonometric values. Express your answers exactly. cos(5π3)=sin(5π3)=+x+=x+\begin{array}{l} \cos \left(\frac{5 \pi}{3}\right)=\square \\ \sin \left(\frac{5 \pi}{3}\right)=\square \frac{\overline{+x}}{+=\frac{x}{+}} \end{array}

See Solution

Problem 2337

Rewriting Exponents and Logs Complete the following table. Rewrite the given Exponential Equations as Logarithmic Equations and rewrite the given Logarithmic Equations as Exponential Equations.
Note: Use the "functions" tab on the math palette to enter log equations. \begin{tabular}{|l||c||} \hline \hline Exponential Equation & Logarithmic Equation \\ \hline \hline 4x=294^{x}=29 & log4(29=x)\log _{4}(29=x) \\ \hline 15x=515^{x}=5 & log15(5=x)\log _{15}(5=x) \\ \hline \hline 63=9x6^{-3}=9 x & log6(9=x)\log _{6}(9=x) \\ \hline \hline & log9x=2\log _{9} x=2 \\ \hline \hline & log24327x=5\log _{243} 27 x=5 \\ \hline & log21380=4x\log _{2} 1380=4 x \\ \hline \end{tabular}

See Solution

Problem 2338

Find the xx - and yy-intercepts of the graph of the linear equation 3x=6y+23 x=6 y+2 A. (23,0),(0,13)\left(\frac{2}{3}, 0\right),\left(0,-\frac{1}{3}\right) B. (23,0),(13,0)\left(\frac{2}{3}, 0\right),\left(\frac{1}{3}, 0\right) c. (0,3),(23,0)(0,-3),\left(\frac{2}{3}, 0\right) D. (3,0),(0,23)(-3,0),\left(0, \frac{2}{3}\right)

See Solution

Problem 2339

Evaluate the expression. 42×1344-2 \times 1 \frac{3}{4}
Write your answer as a fraction or as a whole or mixed number. \square

See Solution

Problem 2340

Question Given f(x)=4x+1f(x)=4 x+1, find f(4)f(-4).
Answer Attempt 1 out of 2 Submit Answer

See Solution

Problem 2341

h=10 cm s=11 cml=15 cm b=11 cm\mathrm{h}=10 \mathrm{~cm} \quad \mathrm{~s}=11 \mathrm{~cm} \quad \mathrm{l}=15 \mathrm{~cm} \quad \mathrm{~b}=11 \mathrm{~cm} Calculate the Area of each face of the triangular prism. Then solve for the Surface Area.
Surface Area = \square cm2\mathrm{cm}^{2} Submit Question

See Solution

Problem 2342

Question
Given h(x)4x3h(x)--4 x-3, find h(2)h(2)
Answer Attempt 1 out of 2

See Solution

Problem 2343

efunction m=303cm=30-3 c represents the amount ( mm, in dollars) of money you have left affer you bought ( cc ) pieces of candy. lect all that apply. The domain is discrete. The independent valiatble is mm, and the dependent variable is cc. The independent variable is cc, and dependent variable is mm. The stope is -3. The domain is continuous. The stope is 30.

See Solution

Problem 2344

Question
Given g(x)=x2g(x)=-x-2, find g(5)g(-5)
Answer Attempt i out of 2

See Solution

Problem 2345

Evaluate the expression. 145+14×5151 \frac{4}{5}+\frac{1}{4} \times 5 \frac{1}{5}
Write your answer as a fraction or as a whole or mixed number. \square

See Solution

Problem 2346

Simplify to create an equivalent expressic 196(k2)19-6(-k-2)
Choose 1 answer:

See Solution

Problem 2347

Simplify. (1.62x3.21)+(5.4x+2.37)(1.62 x-3.21)+(-5.4 x+2.37) 1.59x3.03-1.59 x-3.03 7.02x+5.587.02 x+5.58 3.99x83.99 x-8 3.78x0.84-3.78 x-0.84

See Solution

Problem 2348

Evaluate the expression. 78×312÷113\frac{7}{8} \times 3 \frac{1}{2} \div 1 \frac{1}{3}
Write your answer as a fraction or as a whole or mixed number. \square

See Solution

Problem 2349

210+211+212++220042n2m2^{10}+2^{11}+2^{12}+\ldots+2^{2004} \rightarrow 2^{n}-2^{m} m,n=m, n= natural numbers

See Solution

Problem 2350

Evaluate the expression. (5144)×412\left(5 \frac{1}{4}-4\right) \times 4 \frac{1}{2}
Write your answer as a fraction or as a

See Solution

Problem 2351

Evaluate. {5+[5(24)÷2]}4\{5+[-5(2-4) \div 2]\} \cdot 4 15-15 13-13 25 40

See Solution

Problem 2352

Discuss the symmetry of the graph of the function, and determine whether the function is even, odd, or neither. f(x)=3x64x2f(x)=3 x^{6}-4 x^{2}
This graph is A. symmetric about the yy-axis. B. symmetric about the x-axis. C. not symmetric about either.
This function is A. neither. B. odd. C. even.

See Solution

Problem 2353

1. What is the solution to the inequality 5823+1.8x-58 \geq 23+1.8 x ? A. 19.4x19.4 \geq x B. 19.4x19.4 \leq x 45x45x\begin{array}{l} -45 \geq x \\ -45 \leq x \end{array}

See Solution

Problem 2354

Find the discriminant. 4=6z22z4=-6 z^{2}-2 z
What type of solutions does the equation have? one real solution two real two complex (non-real) solutions solutions Submit

See Solution

Problem 2355

Express the quadratic function f(x)=3x2+6x2 in standard form, sketch the graph, and find its maximum or minimum value.\text{Express the quadratic function } f(x) = -3x^2 + 6x - 2 \text{ in standard form, sketch the graph, and find its maximum or minimum value.}

See Solution

Problem 2356

f(x)=2x2+x6f(x) = 2x^2 + x - 6
Express the quadratic function in standard form, sketch its graph, find its maximum or minimum value.

See Solution

Problem 2357

斉 Factor completely. 5q2+24q55 q^{2}+24 q-5

See Solution

Problem 2358

(9x5+5x49x2+10x)(12x5+2x4x29)\left(9 x^{5}+5 x^{4}-9 x^{2}+10 x\right)-\left(12 x^{5}+2 x^{4}-x^{2}-9\right)

See Solution

Problem 2359

Chase Cavan HW Score: 67.11%,25.567.11 \%, 25.5 of 38 Question 29, 5.5.19 points Part 1 of 3 Points: 0 of 1 Save
Two triangles can be formed using the given measurements. The other measurements of the triangle in which angle BB is acute are also given. Solve the triangle in which angle BB is obtuse. A=42a=8b=11A=42^{\circ} \quad a=8 \quad b=11
For the first triangle, the angle BB is 66.966.9^{\circ}, the measure of angle CC is 71.171.1^{\circ}, and the length of side C is 11.3 . Now consider the second triangle. The measure of angle BB is \square^{\circ}. (Round to the nearest tenth as needed.)

See Solution

Problem 2360

11/4×32/511 / 4 \times 32 / 5

See Solution

Problem 2361

Evaluate the limit, using L'Hôpital's Rule. Enter INF for \infty, -INF for -\infty, or DNE if the limit does not exist, but is neither \infty nor -\infty. limx0+15xlnx=\lim _{x \rightarrow 0^{+}} 15 x \ln x= \square Preview My Answers Submit Answers

See Solution

Problem 2362

Trovare il simmetrico del punto P(1,2)P(1,2) rispetto alla retta x+y5=0x+y-5=0.

See Solution

Problem 2363

Find the first four terms of the sequence given by the following. an=2n3n+2,n=1,2,3,a_{n}=\frac{2^{n}}{3^{n}+2}, n=1,2,3, \ldots

See Solution

Problem 2364

Find the first four terms of the sequence given by the following. an=4(3)n1,n=1,2,3a_{n}=4(3)^{n-1}, n=1,2,3 \ldots १.०.०.

See Solution

Problem 2365

(3/41/4)×2/3(3 / 4-1 / 4) \times 2 / 3 1/31 / 3 1/21 / 2 6/93486 / 9348 4/16

See Solution

Problem 2366

14913\frac{-1}{49}-\frac{1}{3}

See Solution

Problem 2367

4x3y2xy39x5y25x\frac{4 x^{3} y}{2 x y^{3}} \cdot \frac{9 x^{5} y^{2}}{5 x}

See Solution

Problem 2368

Mathematics
Question 1 of 5
If 3m=13^{m}=1, which of the following is a possible value of mm ? A. -1 B. 0 C. 1 D. 2 E. 3

See Solution

Problem 2369

20. 3z3+4z33 z^{3}+4-z^{3}

See Solution

Problem 2370

The total, TT, of the interior angles of a polygon with nn sides is given by T=180×(n2)T=180^{\circ} \times(n-2)
Calculate the total of the interior angles of this heptagon. Watch video

See Solution

Problem 2371

x56x2+18x18x2+90xx225\frac{x-5}{6 x^{2}+18 x} \cdot \frac{18 x^{2}+90 x}{x^{2}-25}

See Solution

Problem 2372

In TRS,mS=118,s=16ft,r=5ft\triangle T R S, m \angle S=118^{\circ}, s=16 \mathrm{ft}, r=5 \mathrm{ft} Find mRm \angle R

See Solution

Problem 2373

1. Determine the value of (fg)(2)(f \circ g)(2) if f(x)=5x+1 and g(x)=x22x+1f(x)=-5 x+1 \text { and } g(x)=x^{2}-2 x+1 100 44-44 4-4 36 Clear All

See Solution

Problem 2374

Express 481448^{\frac{1}{4}} in simplest radical form.
Answer Attempt 1 out of 2 \square Sulmit Answer

See Solution

Problem 2375

Give the name (monomial, binomial, trinomial, etc.) and the degree of the polynomial. 7x4+8x3 Name =[?] Degree =\begin{array}{l} 7 x^{4}+8 x^{3} \\ \text { Name }=[?] \\ \text { Degree }= \end{array}

See Solution

Problem 2376

Give the name (monomial, binomial, trinomial, etc.) and the degree of the polynomial. x42 Name =[?] Degree =\begin{array}{c} x^{42} \\ \text { Name }=[?] \\ \text { Degree }= \end{array}

See Solution

Problem 2377

Determine the value of yy, if xx is 16 . y=x11y=\sqrt{x}-11
Answer Attempt 1 out of 3 y=y= \square Submit Answer

See Solution

Problem 2378

Solve each equation. Write your answer as a logarithm and find the decimal approximation. 10(x1)=37510^{(-x-1)}=375
Enter your answers in the boxes below. Э
Logarithm: x=x= \square
Decimal approximation: \square

See Solution

Problem 2379

Question Given f(x)=x2f(x)=-x^{2}, find f(2)f(-2)
Answer Attempt 1 out of 2{ }_{2}

See Solution

Problem 2380

Solve each equation. Write your answer as a logarithm and find the decimal approximation. 5(10x+2)=255\left(10^{x+2}\right)=25
Enter your answers in the boxes below.
Logarithm: x=x= \square Math Sy
Decimal approximation: \square

See Solution

Problem 2381

s shows an equation. +hx2+16x+1=3x2x+1+15x+1\frac{+h x^{2}+16}{x+1}=3 x^{2}-x+1+\frac{15}{x+1} (1)
What value for hh will make the equation true if x1x \neq-1 ? (5))
Enter your response here: \square
Only 0,1,2,3,4,5,6,7,8,9,0,1,2,3,4,5,6,7,8,9, \ldots, and / are allowed in your answer. Mixed numbers are entered by adding a space after the whole number. Spaces are only allowed between whole numbers and fractions.

See Solution

Problem 2382

Simplify. 344x+12x12+12x\frac{3}{4}-4 x+\frac{1}{2} x-\frac{1}{2}+\frac{1}{2} x
Enter your answer in the box. Do not use decimals in your answer.

See Solution

Problem 2383

1.) m<A=31c=20mi,a=16mim<A=31^{\circ} c=20 \mathrm{mi}, a=16 \mathrm{mi}

See Solution

Problem 2384

Factor. x213x+12x^{2}-13 x+12

See Solution

Problem 2385

Factor completely. 6x2+78x+726 x^{2}+78 x+72

See Solution

Problem 2386

(12x46x2+2x+14)(3x45x3+9x+3)\left(12 x^{4}-6 x^{2}+2 x+14\right)-\left(3 x^{4}-5 x^{3}+9 x+3\right)

See Solution

Problem 2387

=1=1 =3=3 4\equiv 4 5
Factor. 7y25y27 y^{2}-5 y-2 \square

See Solution

Problem 2388

Simplify. 14(3x7)+34x\frac{1}{4}(3 x-7)+\frac{3}{4} x 112x1341 \frac{1}{2} x-1 \frac{3}{4} 334x1343 \frac{3}{4} x-1 \frac{3}{4} 34x1\frac{3}{4} x-1 34x+212\frac{3}{4} x+2 \frac{1}{2}

See Solution

Problem 2389

32k+2432 k+24
Factor using the distributive property and the greatest common factor to write an equivalent expression. Enter your answer by filling in the boxes. 32k+24=32 k+24= \square ( ) 1 2 3 4 5 6

See Solution

Problem 2390

Factor completely. 364z236-4 z^{2}

See Solution

Problem 2391

Factor completely. 5u610u5+40u45 u^{6}-10 u^{5}+40 u^{4}

See Solution

Problem 2392

Evaluate. {3+[5(24)÷2]}3\{3+[-5(2-4) \div 2]\} \cdot 3 27-27 13-13 18 24

See Solution

Problem 2393

x1=3x12x2,x1(0)=3x2=2x12x2,x2(0)=12\begin{array}{rll} & x_{1}^{\prime}=3 x_{1}-2 x_{2}, & x_{1}(0)=3 \\ & x_{2}^{\prime}=2 x_{1}-2 x_{2}, & x_{2}(0)=\frac{1}{2}\end{array}

See Solution

Problem 2394

(03.05MC(03.05 \mathrm{MC} ) II EFG=Δ1\triangle E F G=\Delta 1 MIN with a ratio of 4.1 , which of the following is true? EFLM=FGLN\frac{\overline{E F}}{\overline{L M}}=\frac{\overline{F G}}{\overline{L N}} EF=LM\overline{E F}=\overline{\mathrm{LM}} EFLM=FGMN\frac{\overline{E F}}{L M}=\frac{\overline{F G}}{M N} EG=LM\overline{E G}=\overline{L M}

See Solution

Problem 2395

Evaluate the expression when b=9b=9. b2+13b^{2}+13

See Solution

Problem 2396

(sinx+cosx)2=1+2sinxcosx(\sin x+\cos x)^{2}=1+2 \sin x \cos x

See Solution

Problem 2397

A person throws a stone into the air. The height, in feet, h(t)h(t) after tt seconds is given by the following equation. h(t)=16t2+59t+19h(t)=-16 t^{2}+59 t+19 a. What is the height of the stone after 3 seconds? b. When is the stone at a height of 38 feet? c. When does the stone reach the ground? a. The height of the stone after 3 seconds is \square feet. b. When is the stone at a height of 38 feet? \square seconds (Round to two decimal places as needed. Use a comma to separate answers as needed.) c. The stone will reach the ground in \square seconds. (Round to two decimal places as needed.)

See Solution

Problem 2398

Providing brief explanations, say whether the expressions below is equivalent to log(abc)\log \left(\frac{\mathrm{ab}}{\sqrt{c}}\right), where a,b,ca, b, c are positive constants log(ab)+0.5log1c\log (a b)+0.5 \log \frac{1}{c}
Chapter 7, Section 7.1, Intelligent Tutoring Problem 053
Re-write the given expression using one of the Properties of the Common Logarithm log(bt)=tlog(b)\log \left(b^{t}\right)=t \cdot \log (b) [Choose the correct answer.] log(ab)+0.5log1c=log(ab)+log((1c)0.5)\log (a b)+0.5 \log \frac{1}{c}=\log (a b)+\log \left(\left(\frac{1}{c}\right)^{0.5}\right) log(ab)+0.5log1c=log(ab)+log(0.5c)\log (a b)+0.5 \log \frac{1}{c}=\log (a b)+\log \left(\frac{0.5}{c}\right) log(ab)+0.5log1c=log(ab)+log(1c)\log (a b)+0.5 \log \frac{1}{c}=\log (a b)+\log \left(\frac{1}{c}\right) log(ab)+0.5logf7=log(ab)(1c)\log (a b)+0.5 \log f_{7}=\log (a b)\left(\frac{1}{c}\right)

See Solution

Problem 2399

Simplify the right side of the equation. Use a graphing calculator table to verify your work. f(x)=x2+12x+32x25x36f(x)=\begin{array}{l} f(x)=\frac{x^{2}+12 x+32}{x^{2}-5 x-36} \\ f(x)=\square \end{array} \square (Simplify your answer. Use integers or fractions for any numbers in the expression.)

See Solution

Problem 2400

Question 13 Given logm6=12\log _{m} \sqrt{6}=\frac{1}{2}, find the value of mm. Type here

See Solution
banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord