1. Introduction To Polynomials

2. The following are examples of monomials in one variable

3. The following are examples of monomials in one variable

4. The following are examples of monomials in one variable

5. The following are examples of monomials in one variable

6. The following are examples of monomials in one variable

7. The following are examples of monomials in one variable

8. A monomial is an expression of the type axn,

9. A monomial is an expression of the type axn,
where a is a real number constant

10. A monomial is an expression of the type axn,
where a is a real number constant
and n is a nonnegative integer.

11. Algebraic expressions like the following are polynomials.

12. Algebraic expressions like the following are polynomials.

13. Algebraic expressions like the following are polynomials.

14. Algebraic expressions like the following are polynomials.

15. Algebraic expressions like the following are polynomials.

16. Algebraic expressions like the following are polynomials.

17. Algebraic expressions like the following are polynomials.

18. Algebraic expressions like the following are polynomials.

19. Algebraic expressions like the following are polynomials.

20. Algebraic expressions like the following are polynomials.

21. A polynomial is a monomial or a combination of sums and/or differences of monomials.

22. The following algebraic expressions are not polynomials.

23. The following algebraic expressions are not polynomials.

24. The following algebraic expressions are not polynomials.

25. The following algebraic expressions are not polynomials.

26. The following algebraic expressions are not polynomials.
Polynomials do not contain quotients.

27. Evaluate the polynomial when x = 2

28. Evaluate the polynomial when x = 2

29. Evaluate the polynomial when x = 2

30. Evaluate the polynomial when x = 2

31. Evaluate the polynomial when x = 2

32. Evaluate the polynomial when x = 2

33. Evaluate the polynomial when x = 2

34. Evaluate the polynomial when x = 2

35. Evaluate the polynomial when x = 2

36. Evaluate the polynomial when x = 2

37. Evaluate the polynomial when x = 2

38. Evaluate the polynomial when x = 2

39. Evaluate the polynomial when x = 2

40. Evaluate the polynomial when x = 2

41. Evaluate the polynomial when x = 2

42. Evaluate the polynomial when x = 2

43. Evaluate the polynomial when x = 2

44. Evaluate the polynomial when x = 2

45. Evaluate the polynomial when x = 2

46. Evaluate the polynomial when x = 2

47. Evaluate the polynomial when x = 2

48. Evaluate the polynomial when x = 2

49. Evaluate the polynomial when x = 2

50. Evaluate the polynomial when x = 2

51. Evaluate the polynomial when x = -4

52. Evaluate the polynomial when x = -4

53. Evaluate the polynomial when x = -4

54. Evaluate the polynomial when x = -4

55. Evaluate the polynomial when x = -4

56. Evaluate the polynomial when x = -4

57. Evaluate the polynomial when x = -4

58. Evaluate the polynomial when x = -4

59. Evaluate the polynomial when x = -4

60. Evaluate the polynomial when x = -4

61. Evaluate the polynomial when x = -4

62. Evaluate the polynomial when x = -4

63. Evaluate the polynomial when x = -4

64. Evaluate the polynomial when x = -4

65. Evaluate the polynomial when x = -4

66. Evaluate the polynomial when x = -4

67. Evaluate the polynomial when x = -4

68. Evaluate the polynomial when x = -4

69. Evaluate the polynomial when x = -4

70. Evaluate the polynomial when x = -4

71. Evaluate the polynomial when x = -4

72. x Use only the given graph of y = 2x – 2 to evaluate the polynomial

73. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

74. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

75. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

76. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

77. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

78. x Use only the given graph of y = 2x – 2 to evaluate the polynomial
when x = 3 x

80. In a sports league of x teams in which each team plays every other team twice, the total number of games N to be played is given by the polynomial equation

81. In a sports league of x teams in which each team plays every other team twice, the total number of games N to be played is given by the polynomial equation
N = x2 – x

82. In a sports league of x teams in which each team plays every other team twice, the total number of games N to be played is given by the polynomial equation
N = x2 – x
A women’s slow-pitch softball league has 10 teams.

83. In a sports league of x teams in which each team plays every other team twice, the total number of games N to be played is given by the polynomial equation
N = x2 – x
A women’s slow-pitch softball league has 10 teams. What is the total number of games to be played?

84. Evaluate the polynomial when x = 10

85. Evaluate the polynomial when x = 10

86. Evaluate the polynomial when x = 10

87. Evaluate the polynomial when x = 10

88. Evaluate the polynomial when x = 10

89. Evaluate the polynomial when x = 10

90. Evaluate the polynomial when x = 10

91. Evaluate the polynomial when x = 10

92. Evaluate the polynomial when x = 10

93. Evaluate the polynomial when x = 10

94. The concentration C, in parts per million of a certain antibiotic in the bloodstream after t hours is given by the polynomial expression

95. The concentration C, in parts per million of a certain antibiotic in the bloodstream after t hours is given by the polynomial expression
C = -0.05t2 + 2t + 2

96. The concentration C, in parts per million of a certain antibiotic in the bloodstream after t hours is given by the polynomial expression
C = -0.05t2 + 2t + 2
To find the concentration after 2 hours, we evaluate the polynomial when t = 2

97. Evaluate the polynomial when t = 0

98. Evaluate the polynomial when t = 0

99. Evaluate the polynomial when t = 0

100. Evaluate the polynomial when t = 0

101. Evaluate the polynomial when t = 0

102. Evaluate the polynomial when t = 0

103. Evaluate the polynomial when t = 0

104. Evaluate the polynomial when t = 0

105. Evaluate the polynomial when t = 0

106. Evaluate the polynomial when t = 0

107. Evaluate the polynomial when t = 0

108. Evaluate the polynomial when t = 0

109. Evaluate the polynomial when t = 0

110. Evaluate the polynomial when t = 0

111. Evaluate the polynomial when t = 0

112. Evaluate the polynomial when t = 0

113. Evaluate the polynomial when t = 0

114. Evaluate the polynomial when t = 2

115. Evaluate the polynomial when t = 2

116. Evaluate the polynomial when t = 2

117. Evaluate the polynomial when t = 2

118. Evaluate the polynomial when t = 2

119. Evaluate the polynomial when t = 2

120. Evaluate the polynomial when t = 2

121. Evaluate the polynomial when t = 2

122. Evaluate the polynomial when t = 2

123. Evaluate the polynomial when t = 2

124. Evaluate the polynomial when t = 2

125. Evaluate the polynomial when t = 10

126. Evaluate the polynomial when t = 10

127. Evaluate the polynomial when t = 10

128. Evaluate the polynomial when t = 10

129. Evaluate the polynomial when t = 10

130. Evaluate the polynomial when t = 10

131. Evaluate the polynomial when t = 10

132. Evaluate the polynomial when t = 10

133. Evaluate the polynomial when t = 10

134. Evaluate the polynomial when t = 10

135. Evaluate the polynomial when t = 10

136. Evaluate the polynomial when t = 20

137. Evaluate the polynomial when t = 20

138. Evaluate the polynomial when t = 20

139. Evaluate the polynomial when t = 20

140. Evaluate the polynomial when t = 20

141. Evaluate the polynomial when t = 20

142. Evaluate the polynomial when t = 20

143. Evaluate the polynomial when t = 20

144. Evaluate the polynomial when t = 20

145. Evaluate the polynomial when t = 20

146. Evaluate the polynomial when t = 20

147. Evaluate the polynomial when t = 30

148. Evaluate the polynomial when t = 30

149. Evaluate the polynomial when t = 30

150. Evaluate the polynomial when t = 30

151. Evaluate the polynomial when t = 30

152. Evaluate the polynomial when t = 30

153. Evaluate the polynomial when t = 30

154. Evaluate the polynomial when t = 30

155. Evaluate the polynomial when t = 30

156. Evaluate the polynomial when t = 30

157. Evaluate the polynomial when t = 30

158. The polynomial in the previous example can be graphed if we evaluate the polynomial for several values of t. We list the values in a table and show the graph below.

159. The concentration peaks when x = 20.
After 40 hours the concentration is 0.

160. Find an equivalent polynomial using only addition.

161. Find an equivalent polynomial using only addition.

162. Find an equivalent polynomial using only addition.

163. Find an equivalent polynomial using only addition.

164. Find an equivalent polynomial using only addition.

165. Find an equivalent polynomial using only addition.

166. Find an equivalent polynomial using only addition.

167. Find an equivalent polynomial using only addition.

168. Find an equivalent polynomial using only addition.

169. Find an equivalent polynomial using only addition.

170. Find an equivalent polynomial using only addition.

171. Identify the terms of the polynomial

172. Identify the terms of the polynomial

173. Identify the terms of the polynomial

174. Identify the terms of the polynomial

175. Identify the terms of the polynomial

176. Identify the terms of the polynomial

177. Identify the terms of the polynomial

178. Identify the terms of the polynomial

179. Identify the terms of the polynomial

180. Identify the terms of the polynomial

181. Identify the terms of the polynomial

182. Like Terms Not Like Terms

183. Like Terms Not Like Terms

184. Like Terms Not Like Terms

185. Like Terms Not Like Terms

186. Like Terms Not Like Terms

187. Like Terms Not Like Terms

188. Like Terms Not Like Terms

189. Like Terms Not Like Terms

190. Like Terms Not Like Terms

191. Like Terms Not Like Terms

192. Like Terms Not Like Terms

193. Like Terms Not Like Terms

194. Like Terms Not Like Terms

195. When you add
like terms you get like terms

196. Like Terms Not Like Terms

197. Like Terms Not Like Terms

198. Like Terms Not Like Terms

199. Like Terms Not Like Terms

200. Like Terms Not Like Terms

201. Like Terms Not Like Terms

202. Identify the like terms of the polynomial

203. Identify the like terms of the polynomial

204. Identify the like terms of the polynomial

205. Identify the like terms of the polynomial

206. Identify the like terms of the polynomial

207. Identify the like terms of the polynomial

208. Identify the like terms of the polynomial

209. Identify the like terms of the polynomial

210. Identify the like terms of the polynomial

211. Identify the like terms of the polynomial

212. Identify the like terms of the polynomial

213. Identify the like terms of the polynomial

214. Identify the like terms of the polynomial

215. Identify the like terms of the polynomial

216. Identify the like terms of the polynomial

217. Identify the like terms of the polynomial

218. Identify the like terms of the polynomial

219. Identify the like terms of the polynomial

220. Identify the like terms of the polynomial

221. Identify the like terms of the polynomial

222. Coefficients
What is the coefficient of the term?

223. Coefficients
What is the coefficient of the term?

224. Coefficients
Identify the coefficients

225. Coefficients
Identify the coefficients

226. Coefficients
Identify the coefficients

227. Coefficients
Identify the coefficients

228. Coefficients
Identify the coefficients

229. Coefficients
Identify the coefficients

230. Coefficients
Identify the coefficients

231. Coefficients
Identify the coefficients

232. Coefficients
Identify the coefficients

233. Coefficients
Identify the coefficients

234. Coefficients
Identify the coefficients

235. Collect the like terms

236. Collect the like terms

237. Collect the like terms

238. Collect the like terms

239. Collect the like terms

240. Collect the like terms

241. Collect the like terms

242. Collect the like terms

243. Collect the like terms

244. Collect the like terms

245. Collect the like terms

246. Collect the like terms

247. Collect the like terms

248. Collect the like terms

249. Collect the like terms

250. Collect the like terms

251. Collect the like terms

252. Collect the like terms

253. Collect the like terms

254. Collect the like terms

255. Collect the like terms

256. Collect the like terms

257. Collect the like terms

258. Collect the like terms

259. Collect the like terms

260. Collect the like terms

261. Collect the like terms

262. Collect the like terms

263. Collect the like terms

264. Collect the like terms

265. Collect the like terms

266. Collect the like terms

267. Collect the like terms

268. Collect the like terms

269. Collect the like terms

270. Collect the like terms.

271. Collect the like terms.

272. Collect the like terms.

273. Collect the like terms.

274. Collect the like terms.

275. Collect the like terms.

276. Collect the like terms.

277. Collect the like terms.

278. Collect the like terms.

279. Collect the like terms.

280. Collect the like terms.

281. Collect the like terms.

282. Collect the like terms.

283. Collect the like terms.

284. Collect the like terms.

285. Collect the like terms.

286. Collect the like terms.

287. Collect the like terms.

288. Collect the like terms.

289. Collect the like terms.

290. Collect the like terms.

291. Collect the like terms.

292. Descending order

293. Descending order

294. Descending order

295. Descending order

296. Descending order

297. Descending order

298. Arrange the polynomial in descending order

299. Arrange the polynomial in descending order

300. Arrange the polynomial in descending order

301. Arrange the polynomial in descending order

302. Arrange the polynomial in descending order

303. Arrange the polynomial in descending order

304. Arrange the polynomial in descending order

305. Arrange the polynomial in descending order

306. Arrange the polynomial in descending order

307. Arrange the polynomial in descending order

308. Arrange the polynomial in descending order

309. Collect like terms and arrange the polynomial in descending order

310. Collect like terms and arrange the polynomial in descending order

311. Collect like terms and arrange the polynomial in descending order

312. Collect like terms and arrange the polynomial in descending order

313. Collect like terms and arrange the polynomial in descending order

314. Collect like terms and arrange the polynomial in descending order

315. Collect like terms and arrange the polynomial in descending order

316. Collect like terms and arrange the polynomial in descending order

317. Collect like terms and arrange the polynomial in descending order

318. Collect like terms and arrange the polynomial in descending order

319. The degree of a term is the exponent of the variable.

320. The degree of a term is the exponent of the variable.
What is the degree of the term?

321. The degree of a term is the exponent of the variable.
What is the degree of the term?

322. The degree of a term is the exponent of the variable.
What is the degree of the term?

323. Identify the degree of each term of

324. Identify the degree of each term of

325. Identify the degree of each term of

326. Identify the degree of each term of

327. Identify the degree of each term of

328. Identify the degree of each term of

329. Identify the degree of each term of

330. Identify the degree of each term of

331. The degree of a polynomial is the largest of the degrees of the terms, unless it is the polynomial 0.

332. The polynomial 0 is a special case.

333. The polynomial 0 is a special case.

334. The polynomial 0 is a special case.
We agree that it has no degree either as a term or as a polynomial.

335. The polynomial 0 is a special case.
We agree that it has no degree either as a term or as a polynomial.
This is because we can express

336. The polynomial 0 is a special case.
We agree that it has no degree either as a term or as a polynomial.
This is because we can express
0 as 0x5 = 0x7,

337. The polynomial 0 is a special case.
We agree that it has no degree either as a term or as a polynomial.
This is because we can express
0 as 0x5 = 0x7,
and so on, using any exponent we wish.

338. Identify the degree of the polynomial

339. Identify the degree of the polynomial

340. Identify the degree of the polynomial

341. Identify the degree of the polynomial

342. Identify the degree of the polynomial

343. Identify the degree of the polynomial

344. Identify the degree of the polynomial

345. Identify the degree of the polynomial

346. Identify the degree of the polynomial

347. Lets summarize the terminology that we have learned
Lets summarize the terminology that we have learned. Using the polynomial

348. Term
Coefficient
Degree of the Term
Degree of the Polynomial

349. Term
Coefficient
Degree of the Term
Degree of the Polynomial

350. Term
Coefficient
Degree of the Term
Degree of the Polynomial

351. Term
Coefficient
Degree of the Term
Degree of the Polynomial

352. Term
Coefficient
Degree of the Term
Degree of the Polynomial

353. Term
Coefficient
Degree of the Term
Degree of the Polynomial

354. Term
Coefficient
Degree of the Term
Degree of the Polynomial

355. Term
Coefficient
Degree of the Term
Degree of the Polynomial

356. Term
Coefficient
Degree of the Term
Degree of the Polynomial

357. Term
Coefficient
Degree of the Term
Degree of the Polynomial

358. Term
Coefficient
Degree of the Term
Degree of the Polynomial

359. Term
Coefficient
Degree of the Term
Degree of the Polynomial

360. Term
Coefficient
Degree of the Term
Degree of the Polynomial

361. Term
Coefficient
Degree of the Term
Degree of the Polynomial

362. Term
Coefficient
Degree of the Term
Degree of the Polynomial

363. Term
Coefficient
Degree of the Term
Degree of the Polynomial

364. Missing terms.
Identify the missing terms in the polynomial

365. Missing terms.
Identify the missing terms in the polynomial

366. Missing terms.
Identify the missing terms in the polynomial

367. Missing terms.
Identify the missing terms in the polynomial

368. Missing terms.
Identify the missing terms in the polynomial

369. Missing terms.
Identify the missing terms in the polynomial

370. Missing terms.
Identify the missing terms in the polynomial

371. Missing terms.
Write the polynomial with its missing terms

372. Missing terms.
Write the polynomial with its missing terms

373. Missing terms.
Write the polynomial with its missing terms

374. Missing terms.
Write the polynomial with its missing terms

375. Missing terms.
Write the polynomial with its missing terms

376. Missing terms.
Write the polynomial with its missing terms

377. Missing terms.
Write the polynomial with its missing terms

378. Missing terms.
Write the polynomial with its missing terms

379. Missing terms.
Write the polynomial with its missing terms

380. Missing terms.
Write the polynomial with its missing terms

381. Missing terms.
Write the polynomial with its missing terms

382. Missing terms.
Write the polynomial with its missing terms

383. Missing terms.
Write the polynomial with its missing terms

384. Classifying Polynomials

385. Classifying Polynomials
Polynomials with one term are called monomials.

386. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.

387. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.

388. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

389. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

390. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

391. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

392. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

393. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

394. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

395. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

396. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

397. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

398. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

399. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

400. Classifying Polynomials
Polynomials with one term are called monomials.
Polynomials with two terms are called binomials.
Polynomials with three terms are called trinomials.
MONOMIALS
BINOMIALS
TRINOMIALS
NONE OF THESE

401. Lesson 4.3 Numbers