1 Foundations 2 Solving Linear Equations 3 Graphs And Functions 4 Systems Of Linear Equations 5 Polynomials And Polynomial Functions 6 Factoring 7 Rational Expressions And Functions 8 Roots And Radicals 9 Quadratic Equations And Functions 10 Exponential And Logarithmic Functions 11 Conics 12 Sequences, Series And Binomial Theorem Chapter6: Factoring
6.1 Greatest Common Factor And Factor By Grouping 6.2 Factor Trinomials 6.3 Factor Special Products 6.4 General Strategy For Factoring Polynomials 6.5 Polynomial Equations Chapter Questions Section6.5: Polynomial Equations
Problem 6.87TI: Solve: (3m2)(2m+1)=0 . Problem 6.88TI: Solve: (4p+3)(4p3)=0 . Problem 6.89TI: Solve: 3c2=10c8 . Problem 6.90TI: Solve: 2d25d=3 . Problem 6.91TI: Solve: 25p2=49 . Problem 6.92TI: Solve: 36x2=121 . Problem 6.93TI: Solve: (2m+1)(m+3)=12m . Problem 6.94TI: Solve: (k+1)(k1)=8 . Problem 6.95TI: Solve: 18a230=33a . Problem 6.96TI: Solve: 123b=660b2 . Problem 6.97TI: Solve: 8x3=24x218x . Problem 6.98TI: Solve: 16y2=32y3+2y . Problem 6.99TI: For the function f(x)=x22x8 , (a) find x when f(x)=7 (b) Find two points that lie on the graph of... Problem 6.100TI: For the function f(x)=x28x+3 , (a) find x when f(x)=4 (b) Find two points that lie on the graph of... Problem 6.101TI: For the function f(x)=2x27x+5 , find (a) the zeros of the function (b) any x-intercepts of the graph... Problem 6.102TI: For the function f(x)=6x2+13x15 , find (a) the zeros of the function (b) any x-intercepts of the... Problem 6.103TI: The product of two consecutive odd integers is 255. Find the integers. Problem 6.104TI: The product of two consecutive odd integers is 483 Find the integers. Problem 6.105TI: A rectangular sign has area 30 square feet. The length of the sign is one foot more than the width.... Problem 6.106TI: A rectangular patio has area 180 square feet. The width of the patio is three feet less than the... Problem 6.107TI: Justine wants to put a deck in the corner of her backyard in the shape of a right triangle. The... Problem 6.108TI: A meditation garden is in the shape of a right triangle, with one leg 7 feet. The length of the... Problem 6.109TI: Genevieve is going to throw a rock from the top a trail overlooking the ocean. When she throws the... Problem 6.110TI: Calib is going to throw his lucky penny from his balcony on a cruise ship. When he throws the penny... Problem 277E: In the following exercises, solve. 277. (3a10)(2a7)=0 Problem 278E: In the following exercises, solve. 278. (5b+1)(6b+1)=0 Problem 279E: In the following exercises, solve. 279. 6m(12m5)=0 Problem 280E: In the following exercises, solve. 280. 2x(6x3)=0 Problem 281E: In the following exercises, solve. 281. (2x1)2=0 Problem 282E: In the following exercises, solve. 282. (3y+5)2=0 Problem 283E: In the following exercises, solve. 283. 5a226a=24 Problem 284E: In the following exercises, solve. 284. 4b2+7b=3 Problem 285E: In the following exercises, solve. 285. 4m2=17m15 Problem 286E: In the following exercises, solve. 286. n2=56n Problem 287E: In the following exercises, solve. 287. 7a2+14a=7a Problem 288E: In the following exercises, solve. 288. 12b215b=9b Problem 289E: In the following exercises, solve. 289. 49m2=144 Problem 290E: In the following exercises, solve. 290. 625=x2 Problem 291E: In the following exercises, solve. 291. 16y2=81 Problem 292E: In the following exercises, solve. 292. 64p2=225 Problem 293E: In the following exercises, solve. 293. 121n2=36 Problem 294E: In the following exercises, solve. 294. 100y2=9 Problem 295E: In the following exercises, solve. 295. (x+6)(x3)=8 Problem 296E: In the following exercises, solve. 296. (p5)(p+3)=7 Problem 297E: In the following exercises, solve. 297. (2x+1)(x3)=4x Problem 298E: In the following exercises, solve. 298. (y3)(y+2)=4y Problem 299E: In the following exercises, solve. 299. (3x2)(x+4)=12x Problem 300E: In the following exercises, solve. 300. (2y3)(3y1)=8y Problem 301E: In the following exercises, solve. 301. 20x260x=45 Problem 302E: In the following exercises, solve. 302. 3y218y=27 Problem 303E: In the following exercises, solve. 303. 15x210x=40 Problem 304E: In the following exercises, solve. 304. 14y277y=35 Problem 305E: In the following exercises, solve. 305. 18x29=21x Problem 306E: In the following exercises, solve. 306. 16y2+12=32x Problem 307E: In the following exercises, solve. 307. 16p3=24p2+9p Problem 308E: In the following exercises, solve. 308. m32m2=m Problem 309E: In the following exercises, solve. 309. 2x3+72x=24x2 Problem 310E: In the following exercises, solve. 310. 3y3+48y=24y2 Problem 311E: In the following exercises, solve. 311. 36x3+24x2=4x Problem 312E: In the following exercises, solve. 312. 2y3+2y2=12y Problem 313E: In the following exercises, solve. 313. For the function, f(x)=x28x+8 , (a) find when f(x)=4 (b) Use... Problem 314E: In the following exercises, solve. 314. For the function, f(x)=x2+11x+20 , (a) find when f(x)=8 (b)... Problem 315E: In the following exercises, solve. 315. For the function, f(x)=8x218x+5 , (a) find when f(x)=4 (b)... Problem 316E: In the following exercises, solve. 316. For the function, f(x)=18x2+15x10 , (a) find when f(x)=15... Problem 317E: In the following exercises, for each function, find: (a) the zeros of the function (b) the... Problem 318E: In the following exercises, for each function, find: (a) the zeros of the function (b) the... Problem 319E: In the following exercises, for each function, find: (a) the zeros of the function (b) the... Problem 320E: In the following exercises, for each function, find: (a) the zeros of the function (b) the... Problem 321E: In the following exercises, solve. 321. The product of two consecutive odd integers is 143. Find the... Problem 322E: In the following exercises, solve. 322. The product of two consecutive odd integers is 195. Find the... Problem 323E: In the following exercises, solve. 323. The product of two consecutive even integers is 168. Find... Problem 324E: In the following exercises, solve. 324. The product of two consecutive even integers is 288. Find... Problem 325E: In the following exercises, solve. 325. The area of a rectangular carpet is 28 square feet. The... Problem 326E: In the following exercises, solve. 326. A rectangular retaining wall has area 15 square feet. The... Problem 6.108TI: A meditation garden is in the shape of a right triangle, with one leg 7 feet. The length of the...
Related questions
One leg of a right triangle is 28 inches longer than the other leg and the hypotenuse is 52 inches. Find the lengths of the legs of the triangle.
Transcribed Image Text: One leg of a right triangle is 28 inches longer than the other leg, and the hypotenuse is 52 inches.
Find the lengths of the legs of the triangle.
Polygon with three sides, three angles, and three vertices. Based on the properties of each side, the types of triangles are scalene (triangle with three three different lengths and three different angles), isosceles (angle with two equal sides and two equal angles), and equilateral (three equal sides and three angles of 60°). The types of angles are acute (less than 90°); obtuse (greater than 90°); and right (90°).
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