Math, asked by isuhanijaingmailcom, 1 year ago

tanA-1+secA/sec^2Q-tan^A-secA+tanA=1/secA-tanA

Answers

Answered by SuNaInA1735
2

Step-by-step explanation:

tanA (1- secA) – tanA (1+secA) / 1- sec^2A

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA

tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 tanA (1- secA) – tanA (1+secA) / 1- sec^2A= -2tanAsecA / 1- (1 + tan^2A)= -2tanAsecA / -tan^2A= 2secA / tanA= secA * cotA= 2/ cosA * cosA / sinA= 2/ sinA= 2 cosecA proved

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