PRECALCULUS PROBLEMS AND SOLUTIONS
(Part - 13)

Problem 1 :

Find the coefficient a of the given term in the expansion of the binomial.

Binomial : (6x - y)7

Term : ax3y7

Solution :

Problem 2 :

Use the Binomial Theorem to expand the complex number. Simplify your result. (Remember that i = √-1.)

(6 + √-49)3

Solution :

Problem 3 :

Use Pascal's Triangle to find the binomial coefficient.

8C4

Solution :

Problem 4 :

Find the specified n th term in the expansion of the binomial.

(9a + 5b)5,   n = 5

Solution :

Problem 5 :

Use the Binomial Theorem to expand and simplify the expression.

(6x3 - y)5

Solution :

You might like these

Precalculus Problems and Solutions (Part - 1)

Precalculus Problems and Solutions (Part - 2)

Precalculus Problems and Solutions (Part - 3)

Precalculus Problems and Solutions (Part - 4)

Precalculus Problems and Solutions (Part - 5)

Precalculus Problems and Solutions (Part - 6)

Precalculus Problems and Solutions (Part - 7)

Precalculus Problems and Solutions (Part - 8)

Precalculus Problems and Solutions (Part - 9)

Precalculus Problems and Solutions (Part - 10)

Precalculus Problems and Solutions (Part - 11)

Precalculus Problems and Solutions (Part - 12)

Precalculus Problems and Solutions (Part - 13)

Precalculus Problems and Solutions (Part - 14)

Precalculus Problems and Solutions (Part - 15)

Precalculus Problems and Solutions (Part - 16)

Kindly mail your feedback to v4formath@gmail.com

We always appreciate your feedback.

©All rights reserved. onlinemath4all.com

Recent Articles

  1. SAT Math : Problems on Exponents and Radicals

    Jun 20, 25 08:15 PM

    SAT Math : Problems on Exponents and Radicals

    Read More

  2. Digital SAT Math Problems and Solutions (Part - 191)

    Jun 20, 25 07:44 PM

    digitalsatmath259.png
    Digital SAT Math Problems and Solutions (Part - 191)

    Read More

  3. Digital SAT Math Problems and Solutions (Part - 190)

    Jun 19, 25 08:35 PM

    digitalsatmath257.png
    Digital SAT Math Problems and Solutions (Part - 190)

    Read More