SIZE=2*10**5+5; MOD=10**9+7 #998244353 #ここを変更する

inv = [0]*SIZE  # inv[j] = j^{-1} mod MOD
fac = [0]*SIZE  # fac[j] = j! mod MOD
finv = [0]*SIZE # finv[j] = (j!)^{-1} mod MOD
fac[0] = fac[1] = 1
finv[0] = finv[1] = 1
for i in range(2,SIZE):
    fac[i] = fac[i-1]*i%MOD
finv[-1] = pow(fac[-1],MOD-2,MOD)
for i in range(SIZE-1,0,-1):
    finv[i-1] = finv[i]*i%MOD
    inv[i] = finv[i]*fac[i-1]%MOD

def choose(n,r): # nCk mod MOD の計算
    if 0 <= r <= n:
        return (fac[n]*finv[r]%MOD)*finv[n-r]%MOD
    else:
        return 0

def fpsdiv(f,g,N):
    assert g[0] != 0
    f = f[:]
    lg = len(g)
    if g[0] != 1:
        a = pow(g[0],MOD-2,MOD)
        for i in range(len(f)):
            f[i] = f[i]*a%MOD
        for i in range(lg):
            g[i] = g[i]*a%MOD
    f += [0]*max(0,N+1-len(f))
    for i in range(N+1):
        for j in range(1,min(i+1,lg)):
            f[i] = (f[i] - g[j]*f[i-j])%MOD
    return f
    

n = int(input())
N = n//2
f = [choose(n+2*i,i) for i in range(N+1)]
g = [choose(i+i,i) for i in range(N+1)]
h = fpsdiv(f,g,N)
print(sum(h)%MOD)