Here both the modulus function is continuous in its domain.
At x=−1,
\underset{x\rightarrow -{1}^{-}}{\mathrm{lim}}|2{x}^{2}-3x-7|=2&\underset{x\rightarrow -{1}^{+}}{\mathrm{lim}}[4{x}^{2}-1]=2
Hence f(x) is continuous at x=−1
At x=1.
\underset{x\rightarrow {1}^{-}}{\mathrm{lim}}[4{x}^{2}-1]=2&\underset{x\rightarrow {1}^{+}}{\mathrm{lim}}|x+1|+|x-2|=3
Hence, f(x) is discontinuous at x=1
For x∈(−1,1) the function f(x) is discontinuous when [4x2−1]=0/1/2
i.e when x∈±21,±21,±23
