90098 Directions: In the following questions, the Assertions (A) and Reason(s) (R) have been put forward. Read both the statements carefully and choose the correct alternative from the following: Assertion:The polynomial x\(^{1}\) + 4x 4 − 2x 3 + x\(^{1}\) − 1 has four zeros. Reason: The number of zeros that a polynomial can have is equal to the degree of the polynomial.

90099 If the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, \(\text{C}\neq{0}\) are equal, then:

90100 Given that one of the zeroes of the cubic polynomial ax\(^{1}\) + bx\(^{1}\) + cx + d is zero then the product of the other two zeroes is:

90101 If \(\alpha\) and \(\beta\) are the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, then \(\alpha\beta=\)

90098 Directions: In the following questions, the Assertions (A) and Reason(s) (R) have been put forward. Read both the statements carefully and choose the correct alternative from the following: Assertion:The polynomial x\(^{1}\) + 4x 4 − 2x 3 + x\(^{1}\) − 1 has four zeros. Reason: The number of zeros that a polynomial can have is equal to the degree of the polynomial.

90099 If the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, \(\text{C}\neq{0}\) are equal, then:

90100 Given that one of the zeroes of the cubic polynomial ax\(^{1}\) + bx\(^{1}\) + cx + d is zero then the product of the other two zeroes is:

90101 If \(\alpha\) and \(\beta\) are the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, then \(\alpha\beta=\)

90098 Directions: In the following questions, the Assertions (A) and Reason(s) (R) have been put forward. Read both the statements carefully and choose the correct alternative from the following: Assertion:The polynomial x\(^{1}\) + 4x 4 − 2x 3 + x\(^{1}\) − 1 has four zeros. Reason: The number of zeros that a polynomial can have is equal to the degree of the polynomial.

90099 If the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, \(\text{C}\neq{0}\) are equal, then:

90100 Given that one of the zeroes of the cubic polynomial ax\(^{1}\) + bx\(^{1}\) + cx + d is zero then the product of the other two zeroes is:

90101 If \(\alpha\) and \(\beta\) are the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, then \(\alpha\beta=\)

90098 Directions: In the following questions, the Assertions (A) and Reason(s) (R) have been put forward. Read both the statements carefully and choose the correct alternative from the following: Assertion:The polynomial x\(^{1}\) + 4x 4 − 2x 3 + x\(^{1}\) − 1 has four zeros. Reason: The number of zeros that a polynomial can have is equal to the degree of the polynomial.

90099 If the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, \(\text{C}\neq{0}\) are equal, then:

90100 Given that one of the zeroes of the cubic polynomial ax\(^{1}\) + bx\(^{1}\) + cx + d is zero then the product of the other two zeroes is:

90101 If \(\alpha\) and \(\beta\) are the zeroes of a quadratic polynomial ax\(^{1}\) + bx + c, then \(\alpha\beta=\)