Pascal's Triangle
What number does the 67th row of Pascal's Triangle end with?
What is 1
Add: (3x-2) + (3x2+6x)
3x2+9x-2
solve
a4 x 8a
What is 8a5
Using the binomial theorem expand (3x-2y)6
729x6-2430x5y+1944x4y2-216x3y3
What is the degree and #of terms of the problem 5x3-3x2-2x+3.
Cubic polynomial , 4 terms. (the highest exponent is 3)
Using the 5th row of Pascal's Triangle find the coefficients of (a + b)5
What is 1, 5, 10, 10, 5 ,1
Add: (3x2+2x+1) + (2x2-4x-5) + (3x-1)
5x2 + x - 5
solve using synthetic division
(12 + 17r + r3 - 9r2) / (r - 4)
What is r2 - 5r - 3
Use the binomial theorem to expand (h+t)6
h6+5h5t+6h4t2+h3t3
What is the degree and number of terms of the problem -n4-n.
Quartic binomial, 2 terms
Expand (a + b)4 using Pascal's Triangle
What is a4 + 4a3b + 6a2b2 + 4ab3 + b4
Subtract: 5(q+3) -9(q2-3q+2)
-9q2 +32q - 3
solve
(-7x2 - 2x - 2)(-2x2 +8x +3)
What is
14x4 - 52x3 - 33x2 -22x -6
Using the binomial theorem what's the 4th term of (3c+4d)7
181,440c4d3
What is the degree and number of terms of the problem -9v6-3x2-2x+3
Sextic trinomial, 3 terms
Expand (2a - 3b)4 using Pascal's Triangle
What is 16a4 - 96a3b + 216a2b2 - 216ab3 + 81b4
Solve: (4x3y4 - 5x4y2 -2x2y3) - (-7x2y3 - 3x3y4 -7x4y2)
2x4y2 + 7x3y4 + 5x2y3
Solve using long division
(-80p + 25 + 32p2) / (-2 +8p)
What is 4p - 9 + 7/8p - 2
Using binomial theorem what's the 7th term of (3q-2p)6
64p6
What is the degree and number of terms of the problem -10n-7+4n4+8n6
Sextic polynomial, 4 terms
Expand (3a - 5b)3 using Pascal's Triangle then find the total of all the coefficients added together
What is 27a3 - 135a2b + 225ab2 - 125b3
The total is -8
Solve: 3x2 + xy - 5y2 + 2x2 - xy + 3y2 - 6x2 + 4xy -7y2
-x2 - 9y2 + 4xy
Solve.
(80v5+32v4-54v3+35v2-103v+8) / (10v-1)
What is 8v4 +4v3 -5v2 +3v - 10 - 2/10v - 1
Using the binomial theorem what is the coefficient from the 3rd term of (3t+5m)8
510,300
What is the degree and number of terms for the problem -5-28v-32v2
Quadratic trinomial, 3 terms