Question

(1 point) Let P, be the vector space of all polynomials of degree 2 or less, and let 7 be the subspace spanned by 43x - 32x' +26, 102° - 13x -- 7 and 20.x - 15c" +12 a. The dimension of the subspace His b. Is {43. - 32" +26, 10x - 13.-7,20z - 150 +12) a basis for P2? choose ✓ Be sure you can explain and justify your answer. c. Abasis for the subspace His { }. Enter a polynomial or a comma separated list of polynomials.

Answer 1

(a) To find the dimension me just I need to check if the shaming vectors - Ore independent or not. 2 (434–32 x * +267 +BC10x²432 - 7) ++ (202-15x²112) 20 264 -78 +12 r -0 -). 934 -136 +20 r20 - (2) - 32d +108 - 1580 - (3) > 264+27=6, (using ou] -> (434 -13126067/27 ) +20 720 (Put in @s] » |-324 + 10 (260+125 -150 so (rut in (3) - r 3014 - 3384 - 1568 +1408=0 -2242 + 2602 +1201 - 1057 = 0 7 - 7 ( 372-1680 JxS | 36 2 +5 r =0 J x 16 1852 -80% =0 5762 + 0 =0 7612 -0 =2-0. → 370) -16 r =0 =) Y=0

IN Put a=0 and 8=o in equation (4) B = 26 2+128 = 2660) +1260) 2 1 la 3 in depenent vectors => dimension is 3. the given vectors are same as part (1) . We have already observed that they care independent - They form basis for P2 As for l we need 3 set of indeperet for (6) According to put cas His spanned by : 438-32x* +26, - 10x2_134-7 , 20x 15 x² +12 and they are independent » They are basis for H